Methods for determining if boundary distance constraints between shapes are satisfied

ABSTRACT

This disclosure describes methods for determining if arrangements of shapes satisfy boundary distance constraints among those shapes. The first embodiment includes constructing  110  a function which is an exact or approximate analytical representation of the constraint between two shapes. Further, this embodiment includes evaluating  120  the function constructed in  110  to determine if the constraint between the two shapes is exactly or approximately satisfied. 
     The second embodiment includes constructing  210  a function which is an exact or approximate analytical representation of the constraint between two shapes. In addition, this embodiment includes assigning  215  values to variables and/or parameters of the function constructed in  210 . Further, this embodiment includes evaluating  220  the function constructed in  210  using the assignments of  215  to determine if the constraint between the two shapes is exactly or approximately satisfied.

CROSS REFERENCE TO RELATED APPLICATIONS

This application claims the benefits of the earlier filed U.S. Provisional Application Ser. No. 61/231,825, filed 6 Aug. 2009, which is incorporated by reference for all purposes into this specification.

Additionally, this application claims the benefits of the earlier filed U.S. Provisional Application Ser. No. 61/246,648, filed 29 Sep. 2009, which is incorporated by reference for all purposes into this specification.

Further, this application claims the benefits of the earlier filed U.S. Provisional Application Ser. No. 61/248,234, filed 2 Oct. 2009, which is incorporated by reference for all purposes into this specification.

Additionally, this application is a continuation of U.S. patent application Ser. No. 12/844,585, filed Jul. 27, 2010, which is incorporated by reference for all purposes into this specification.

TECHNICAL FIELD

This disclosure relates to determining if boundary distance constraints are satisfied. More specifically, this disclosure relates to determining if arrangements of shapes satisfy exact or approximate analytical function representations of boundary distance constraints among those shapes.

BACKGROUND ART

The process of checking an arrangement of shapes to determine if it satisfies one or more boundary distance (BD) constraints between those shapes has many valuable commercial applications. For brevity we will refer to this process as boundary distance constraint verification (BDCV). Applications of BDCV include, for example, their use in methods to search for arrangements of shapes that exactly or approximately satisfy one or more BD constraints and, their use in checking the results of methods that attempt to generate arrangements of shapes that exactly or approximately satisfy one or more BD constraints to verify that the BD constraints have been exactly or approximately satisfied.

Instances of the BDCV problem include, for example, verifying that two or three dimensional components on or in a manufactured product do not overlap and all components are contained within the product's boundaries. Examples include verifying the BD constraints between: the components inside the body of a car; the components inside the case of a printer; the rooms in a building; the components on a circuit board or; the components on VLSI chip. Other instances include verifying that an arrangement of one or more products or product components in or on a piece of material from which they are to be extracted have sufficient space between them to allow for the kerf of the cutting tool. Examples include versifying the BD constraints between the components of a pair of pants on a bolt of fabric or the components of a ship on a sheet of steel. Other instances in the area of packing and shipping include verifying that an arrangement of packages inside a shipping container satisfy the requirement that no packages occupy the same space and all packages fit inside the container. Some of these instances can further be extended into 4-dimensional problems where, for example, time constraints, or time dependant motion requirements are present.

DEFINITIONS

For the purposes of this disclosure we define the following terms:

Analytical function—A function that is treatable by or using the methods of algebra and calculus.

Axis-aligned orthotopes—A set, O, of n-dimensional orthotopes is axis-aligned if each of the underlying Cartesian coordinate system axis is parallel to one of the faces of every orthotope in O.

Axis-aligned orthotopic boundary distance constraint—A boundary distance constraint applied between two n-dimensional shapes that produces a boundary surface of closest approach between those shapes that is an n-dimensional axis-aligned orthotope.

Boundary distance constraint—A constraint between two n-dimensional objects that limits the distance between the surfaces, or boundaries, of the two objects.

Closed shape—A shape for which all paths starting from a point on one side of its surface and ending on that same point on the other side of its surface must pierce the surface of the shape.

Convex constraint—A constraint on an optimization problem where the set of points satisfying the constraint form a convex set.

Convex set—A set of points where all the points on a line segment connecting any two points in the set are also in the set.

Convex shape—A shape for which the straight line segment connecting any two points on the surface of the shape must remain in the interior of the shape or on its surface.

Fixed-orientation shape—A shape which is not allowed to rotate.

Function—A function takes a set of one or more input values and produces an output value.

N-sphere—An n-dimensional generalization of a sphere where, for example, a circle is a 2-sphere and an ordinary, or 3-dimensional, sphere is a 3-sphere.

N-spheric boundary distance constraint—A boundary distance constraint which when applied between two n-dimensional shapes leads to a boundary surface of closest approach between those two shapes that is an n-sphere.

Normal vector—A vector, v, is normal to a surface, S, if it is perpendicular to all vectors lying in the plane tangent to the surface at the point of intersection between v and S.

Orthogonal—Intersecting or lying at right angles.

Orthotope—An n-dimensional, convex, faceted, closed shape where intersecting facets, or faces, are mutually orthogonal. In layman's terms an orthotope is an n-dimensional generalization of a rectangle.

Orthotopic boundary distance constraint—A boundary distance constraint which when applied between two n-dimensional shapes leads to a boundary surface of closest approach between those two shapes that is an n-dimensional orthotope.

Polytope—An n-dimensional, convex, faceted, closed shape. In layman's terms an polytope is an n-dimensional generalization of a polygon.

Subderivative—A generalization of the notion of a derivative for use on non-smooth curves. For smooth curves there is a single tangent line associated with each point on the curve. The slope of this line is the derivative at that point on the curve. For non-smooth curves there can be a set of tangent lines associated with each point on the curve. The slope of each line in the set is a subderivative.

Superellipsoid—The set of n-dimensional objects that can be analytically represented by an equation of the form:

$\begin{matrix} {{\sum\limits_{i = 1}^{n}{{2\frac{x_{i}}{l_{i}}}}^{Z_{i}}} = 1} & (1) \end{matrix}$

-   Two-dimensional examples, illustrated in FIG. 1A through FIG. 1F,     include circles, ellipses, squares, and rectangles, as well as     “squares with rounded corners” and “rectangles with rounded     corners”. Three-dimensional examples include spheres, ellipsoids, as     well as cubes and boxes, illustrated in FIG. 1G and FIG. 1H, as well     as “cubes with rounded corners” and “boxes with rounded corners”.

SUMMARY OF INVENTION

This disclosure describes methods for determining if arrangements of shapes satisfy exact or approximate analytical function representations of boundary distance constraints among those shapes. The first embodiment determines if an arrangement of two shapes satisfy an exact or approximate analytical function representation of a boundary distance constraint between those shapes. This embodiment includes constructing 110 a function which is an exact or approximate analytical representation of the constraint between two shapes using one or more of the following: (1) one or more external boundary surface of closest approach where at least one of the external boundary surfaces of closest approach is not an n-sphere and each external boundary surface of closest approach is formed from two shapes and, optionally, additional boundary distance constraints between the shapes and is determined using the addition of two or three functions where one of the three functions represents the first shape and another function represents the second shape and, optionally, a third function represents the additional boundary distance constraints between the shapes; (2) one or more analytical compositions or; (3) one or more superellipsoid shape function approximations for the interior or exterior boundary surface of closest approach between a pair of axis aligned orthotopes with axis-aligned orthotopic boundary distance constraints. Further, this embodiment includes evaluating 120 the function constructed in 110 to determine if the constraint between the two shapes is exactly or approximately satisfied.

This disclosure also describes a second embodiment of a method to determine if an arrangement of two shapes satisfies an exact or approximate analytical function representation of a boundary distance constraint between those shapes. This second embodiment includes constructing 210 a function which is an exact or approximate analytical representation of the constraint between two shapes using one or more of the following: (1) one or more external boundary surface of closest approach where at least one of the external boundary surfaces of closest approach is not an n-sphere and each external boundary surface of closest approach is formed from two shapes and, optionally, additional boundary distance constraints between the shapes and is determined using the addition of two or three functions where one of the three functions represents the first shape and another function represents the second shape and, optionally, a third function represents the additional boundary distance constraints between the shapes; (2) one or more analytical compositions or; (3) one or more superellipsoid shape function approximations for the interior or exterior boundary surface of closest approach between a pair of axis aligned orthotopes with axis-aligned orthotopic boundary distance constraints. In addition, this embodiment includes assigning 215 values to variables and/or parameters of the function constructed in 210. Further, this embodiment includes evaluating 220 the function constructed in 210 using the assignments of 215 to determine if the constraint between the two shapes is exactly or approximately satisfied.

BRIEF DESCRIPTION OF DRAWINGS

To aid in the understanding this invention, the attached drawings help illustrate specific features of the invention and the following is a brief description of the attached drawings:

FIG. 1A-1H illustrate various two and three dimensional superellipsoids.

FIG. 2 illustrates the basic concepts of a shape spectrum on a two-dimensional shape.

FIG. 3 illustrates the construction of the unconstrained exterior boundary surface of closest approach between two parallel planar half spaces.

FIG. 4 illustrates the determination of one of the planar half spaces that makes up the unconstrained exterior boundary surface of closest approach formed by two two-dimensional convex shapes.

FIG. 5A-5D illustrate the construction of the shape and a discrete representation of its shape spectrum for the unconstrained exterior boundary surface of closest approach formed by a square and an equilateral triangle.

FIG. 6 illustrates the relationship of the various elements of one approach used to construct a shape function from a shape spectrum for a two-dimensional shape.

FIG. 7A-7B illustrate the geometric construction of the exterior boundary surface of closest approach between two axis aligned rectangles.

FIG. 8A-8B illustrate the geometric construction of the interior boundary surface of closest approach between two axis aligned rectangles.

FIG. 9A-9B illustrate a method for determining an analytical shape function for the unconstrained exterior boundary surface of closest approach between a square and a circle using geometric construction and analytical union.

FIG. 10 illustrates a typical networked computer environment in which the invention would operate.

FIG. 11A-11B illustrate two embodiments of a method for determining if arrangement of two shapes satisfy an exact or approximate analytical function representation of a boundary distance constraint between those shapes.

FIG. 12 illustrates the location and size of four circuit blocks relative to the size and location of a placement boundary.

FIG. 13 illustrates two components to be cut from a sheet of material.

DISCLOSURE OF EMBODIMENTS

This disclosure describes methods for determining if arrangements of shapes satisfy exact or approximate analytical function representations of boundary distance constraints among those shapes. This disclosure describes numerous specific details in order to provide a thorough understanding of the present invention. One skilled in the art will appreciate that one may practice the present invention without these specific details. Additionally, this disclosure does not describe some well known items in detail in order not to obscure the present invention.

Theoretical Motivation

To determine if arrangements of shapes satisfy exact or approximate analytical function representations of boundary distance constraints among those shapes we will develop methods to generate analytic representation of BD constraints, or their approximations, between a pair of shapes. These methods will be based on the use of the boundary surface of closest approach (BSCA) between the pair of shapes and, when necessary, the use of analytical composition techniques.

For the remainder of this disclosure when a specific coordinate system is required to illustrate a concept we will assume, for the sake of brevity and clarity and without loss of generality, that the Cartesian coordinate system will be used unless stated otherwise. One skilled in the art will immediately see that the concepts could be demonstrated using alternate coordinate systems. Further, for the sake of clarity and brevity, this disclosure makes use of indexed notation in the representation of sums, unions, intersections, list, sets, etc. It will be assumed that the indexed entities, such as lists or sets, will contain no elements when the upper bound for an index is less than the lower bound for the index. For example, {x₁, x₂, . . . x_(n)}=∅ when n<1 and where ∅ represents the empty set. Similarly an indexed mathematical operation will contain no terms when the upper bound for an index is less than the lower bound for the index. For example,

${\sum\limits_{i = 1}^{n}x_{i}} = {{x_{1} + x_{2} + {\ldots\mspace{14mu} x_{n}}} = 0}$ when n<1. Finally, for the sake of brevity and clarity, this disclosure will make extensive use of vector notation to represent n-dimensional quantities such as, for example, n-dimensional Cartesian coordinates. These n-dimensional quantities will be represented as column vectors or, equivalently, transposed row vectors. As an example, the 3-dimensional Cartesian coordinate where x=1, y=2, and z=3 would be represented as either the column vector

$\overset{\rightharpoonup}{X} = \begin{bmatrix} 1 \\ 2 \\ 3 \end{bmatrix}$

-   or the transposed row vector     =[1, 2, 3]^(T).     Analytic Representation of BD Constraints

There are two types of BSCA that exist between a pair of shapes, the exterior boundary surface of closest approach (EBSCA) and the interior boundary surface of closest approach (IBSCA). We can further divide these two types into unconstrained BSCAs, UEBSCA and UIBSCA, and constrained BSCAs, CEBSCA and CIBSCA. Roughly speaking, the UEBSCA, UIBSCA, CEBSCA, and CIBSCA between two shapes, S₁ and S₂, can be thought of as follows: the UEBSCA is the shape whose surface is traced out by the origin of S₁ as its exterior surface is “slid” along the exterior surface of S₂; the UIBSCA is the shape whose surface is traced out by the origin of S₁ as its exterior surface is “slid” along the interior surface of S₂; the CEBSCA is the shape whose surface is traced out by the origin of S₁ as its exterior surface is “slid” along the exterior surface of a shape whose exterior surface is derived from the exterior surface of S₂ and any additional boundary distance constraints between S₁ and S₂, and the CIBSCA is the shape whose surface is traced out by the origin of S₁ as its exterior surface is “slid” along the interior surface of a shape whose interior surface is derived from the interior surface of S₂ and any additional boundary distance constraints between S₁ and S₂. As will become clear shortly, one way to determine the CEBSCA, UIBSCA or CIBSCA between two shapes is to transform these problems into one or more UEBSCA problems. As a consequence we will first concentrate on developing methods for determining UEBSCA.

Shapes

Before we can determine a BSCA between two shapes, we first need to define what we mean by a shape. We also need to determine how to represent a shape, and how we can combine two or more of these shapes to form a new shape.

Definition 1: An n-dimensional shape, S, consists of an equivalence relation and a point. The point is referred to as the origin of S, or Origin(S), and defines the position of S in the n-dimensional space. Based on the geometry of S and Origin(S) the equivalence relation subdivides the n-dimensional space into three disjoint sets referred to as the interior, exterior, and boundary sets. The exterior set, Exterior(S), consists of all points that are exterior to the shape. Those points not in Exterior(S), Exterior(S), are further subdivided into the boundary set, Boundary(S), and interior set, Interior(S). Boundary(S) contains all points in Exterior(S) that are immediately adjacent to a point in Exterior(S) and Interior(S) contains all points in Exterior(S) that are not in Boundary(S).

For brevity and convenience we will refer to the equivalence relation imposed by a shape S as Subdivision(S) and define it as the set containing the sets Interior(S),Exterior(S), and Boundary(S), or more precisely: Subdivision(S)={Interior(S),Exterior(S),Boundary(S)}  (2)

As will become apparent shortly, a useful subset of shapes is the set of convex shapes.

Definition 2: A convex shape S is a shape where all points on a line segment joining any pair of points in Boundary(S) must be in Boundary(S) ∪ Interior(S).

Based on Definition 1 we can define the union and intersection operations on shapes.

Definition 3: The union between shapes A and B, A ∪ B, produces a new shape, C. The origin of C is selected to be any finite point, possibly, but not necessarily, related to the origins of A and B. The Subdivision(C) is selected such that Interior(C)=Interior(A)∪Interior(B) Exterior(C)=Exterior(A)∩Exterior(B) Boundary(C)=(Boundary(A)∩Interior(B))∪ (Boundary(B)∩Interior(A))  (3)

Definition 4: The intersection between two shapes A and B, A∩ B, produces a new shape, C. The origin of C is selected to be any finite point, possibly, but not necessarily, related to the origins of A and B. The Subdivision(C) is selected such that Interior(C)=Interior(A)∩Interior(B) Exterior(C)=Exterior(A)∪Exterior(B) Boundary(C)=(Boundary(A)∩ Exterior(B))∪ (Boundary(B)∩ Exterior(A))  (4)

Based on Definitions 1 through 4, a large class of shapes can be defined as a union of convex shapes. We will refer to this as the class of all shapes of engineering interest, or for brevity, all shapes. Further, the intersection of any number of convex shapes is its self a convex shape. This implies that all shapes, S, can be represented as S=∪ _(i=1,n)(∩_(j=1,m) _(n) S _(i,j))  (5)

-   where S_(ij) are convex shapes. As such, any convex shape can be     represented as the intersection of a possibly infinite number of     “planar half spaces”.

Definition 5: In general, a planar half space (PHS) associated with a shape S is a shape H where Origin(H)=Origin(S) and the Subdivision(H) is selected such that: Boundary(H) consists of all points on a plane dividing the space in half, where this plane is tangent to the surface of S at a point

in Boundary(S); Interior(H) consists of the half space on the side of Boundary(H) that contains those points in Interior(S) that are immediately adjacent to

Exterior(H) consists of the half space on the side of Boundary(H) that contains those points in Exterior(S) that are immediately adjacent to

. More specifically, a planar half space (PHS) associated with a convex shape S is a shape H where Origin(H)=Origin(S) and the Subdivision(H) is selected such that: Boundary(H) consists of all points on a plane dividing the space in half, where this plane is tangent to Boundary(S); Interior(S) ⊂ Interior(H) and Interior(H) also contains all points on the boundary of S except for the tangent points.

Shape Spectrums

We can represent a convex shape in terms of a set of PHSs. This set of PHSs can be represented using the origin of the shape along with the shape's shape spectrum.

Definition 6: The tangent planar half space spectrum, or for brevity, shape spectrum, of a shape is a function which represents some or all of the form of the shape relative to its origin. A shape spectrum is a function that relates a direction to a distance. The direction represents the direction of a vector passing through the origin of the shape. The magnitude of the distance returned by a shape function for a given direction is the magnitude of the distance, measured along the vector, between the origin and the boundary plane of a PHS, H, to which the vector is normal. The sign of the distance returned by a shape function for a given direction is negative when the origin of the shape is contained in Exterior(H) and positive when the origin of the shape is contained in Interior(H). We will refer to the distance returned by a shape function for a given direction as the normal distance for that direction.

To determine a shape spectrum from its underlying shape we define the transformation

(S)→

(

)  (6)

-   which takes a shape S, in the shape domain, and transforms it to a     shape spectrum, S(     ), in the tangent PHS domain where     =[θ₁, . . . θ_(n−1)]^(T) defines the direction of a vector through     the origin of the n-dimensional shape S. For the sake of clarity and     brevity and without loss of generality we will assume that     is defined in terms of hyperspherical coordinates and all angles are     measured in degrees. Note that when n=2,     reduces to a scalar, θ, whose value is θ₁, the value of the single     element of     =[θ₁]^(T).

To illustrate the basic concepts consider the two-dimensional example in FIG. 2 where we show the boundary of a convex shape S with a vector v passing through Origin(S) pointing in direction θ. Vector v is normal to the boundary plane, Boundary(H), of the PHS, H, that is tangent to Boundary(S) at point

. The normal distance between Origin(S) and the boundary plane B along v is

(θ) where

(θ) is always positive since Origin(S) ε Interior(H) for all values of θ.

As a simple example of a shape spectrum for a two-dimensional shape, consider a circle of radius one with its origin at the center of the circle. This shape would have the following shape spectrum:

(θ)=1. As a simple three-dimensional example, consider the shape defined by a sphere of radius one with it origin at the center of the sphere. This shape would have the following shape spectrum:

${\mathcal{S}\left( \begin{bmatrix} \theta_{1} \\ \theta_{2} \end{bmatrix} \right)} = 1.$ In these examples, for ease of understanding, we assumed that the origin of the shapes were in the shapes interior set, specifically, in the center of the set. This is not required. In fact, the origin may be anywhere. As a consequence, if the origin is in the exterior set of the shape, one or more of the values of its shape spectrum will be negative.

We define the inverse transformation

(

(S),Origin(S))→S  (7)

-   where     is a transformation that takes a shape spectrum     (     ), in the tangent PHS domain, and a point of origin and transforms     them into a shape S, in the shape domain when     (     ) represents a convex shape.

Additionally we define the following parameterized version of the transformation whose use will become clear shortly:

(S,α)→

(

+

)  (8)

For shapes of finite volume, the distance between the origin of the shape and every tangent PHS must be finite. Conversely, for shapes with infinite volume the distance between the origin and a PHS tangent to the infinite portion of the boundary is infinite. Further, every point on a smooth section of the boundary of the shape is associated with exactly one tangent PHS and we assume that the infinite portion of a shapes boundary is smooth. Conversely, non-smooth shapes have points on the finite boundary which are associated with multiple tangent PHSs, specifically, the “focal” points of a “corner” in the finite boundary.

We now define the notions of dominant and non-dominant PHSs, infinite and finite dominant PHSs, as well as various characterizations of shape spectrums.

Definition 7: For a convex shape, a dominant PHS is a PHS that is tangent to the boundary of the shape and is necessary in order to define at least one point on the boundary of the shape. Conversely, a non-dominant PHS is any tangent PHS that is not necessary to define any point on the boundary of the shape. Further, dominant PHSs can be classified as finite or infinite. A finite dominant PHS is a PHS that is a finite distance from the origin of the shape. Conversely an infinite dominant PHS is a PHS that is an infinite distance from the origin of the shape.

Definition 8: For a convex shape with a finite number dimensions, a shape spectrum can be characterized as continuous, discrete or mixed. If a shape spectrum has only dominant PHSs then the spectrum can be characterized as continuous. If the shape spectrum consists of a finite number of finite dominant PHSs then the spectrum can be characterized as discrete. Finally, if the shape spectrum has an infinite number of finite dominant PHSs as well as one or more non-dominate PHSs, then the spectrum can be characterized as mixed.

Definitions 7 and 8 give us a compact approach for representing a convex shape when the shape's finite boundary is composed of a finite number of facets. In particular, since there are a finite number of facets on a convex polytope and each of the facets of a convex polytope corresponds to a dominant PHS, convex polytopes have discrete spectrums. Since the infinite PHSs, if any, and the distance to the non-dominant PHSs can be determined from the finite dominant PHSs we need only keep track of the position of the finite dominant PHSs. These finite dominant PHSs make up the discrete representation of its shape spectrum. For brevity we will refer to this discrete representation as a DR shape spectrum.

As a two-dimensional example, consider a fixed-orientation Cartesian coordinate system axis-aligned square of height one and width one with its origin at the center of the square. A DR shape spectrum would be:

$\begin{matrix} {{\mathcal{S}(\theta)} = \left\{ \begin{matrix} 0.5 & {\theta = {0{^\circ}}} \\ 0.5 & {\theta = {90{^\circ}}} \\ 0.5 & {\theta = {180{^\circ}}} \\ 0.5 & {\theta = {270{^\circ}}} \end{matrix} \right.} & (9) \end{matrix}$ As a three-dimensional example, consider a fixed-orientation Cartesian coordinate system axis-aligned cube with width, height and depth equal to one and an origin located at its center. A DR shape spectrum would be:

$\begin{matrix} {{\mathcal{S}\left( \overset{\rightharpoonup}{\theta} \right)} = \left\{ \begin{matrix} 0.5 & {{\theta_{1} = {0{^\circ}}},{\theta_{2} = {0{^\circ}}}} \\ 0.5 & {{\theta_{1} = {90{^\circ}}},{\theta_{2} = {0{^\circ}}}} \\ 0.5 & {{\theta_{1} = {180{^\circ}}},{\theta_{2} = {0{^\circ}}}} \\ 0.5 & {{\theta_{1} = {270{^\circ}}},{\theta_{2} = {0{^\circ}}}} \\ 0.5 & {{\theta_{1} = {0{^\circ}}},{\theta_{2} = {90{^\circ}}}} \\ 0.5 & {{\theta_{1} = {0{^\circ}}},{\theta_{2} = {270{^\circ}}}} \end{matrix} \right.} & (10) \end{matrix}$ Assuming a spherical coordinate system in which θ₁ represents the angle of rotation about the Z axis measured from the positive X axis, and θ₂ represents the angle of inclination measured from the XY plane.

Since, in a hyperspherical coordinate system, each direction can be represented by an infinite number of values for the vector of angles,

it will be assumed, for ease of understanding and without loss of generality, that all angles will be represented in their canonical form and all mathematical operations on these angles that produce an angle vector will produce them in canonical form. In the two dimensional case this would mean, for example, that all angles, θ, are restricted to the range 0°≦θ<360°, and that, for example, 310°+180° would result in a value of 130° instead of 490°.

Boundary Surface Shapes

We will now look at how to determine the UEBSCA between two fixed orientation convex shapes. To do this we first need to clearly define the UEBSCA between two fixed orientation shapes.

Definition 9: The unconstrained exterior boundary surface of closest approach (UEBSCA) between two fixed orientation shapes A and B, A {circle around (·)} B, is a new shape, C, where Origin(C)=Origin(A) and Subdivision(C) is selected such that:

-   -   Interior(C) contains all points defined by the location of         Origin(B) for all positionings of B, while maintaining the         position of A and the orientations of both A and B, such that         Interior(A)∩ Interior(B)≠∅, where ∅ represents the empty set.         That is, the set of locations of the origin of B as B is moved         around in a fixed orientation such that the interiors of A and B         overlap.     -   Exterior(C) contains all points defined by the location of         Origin(B) for all positionings of B, while maintaining the         position of A and the orientations of both A and B, such that         Boundary(A)∩ Boundary(B)=∅ and Interior(A)∩ Interior(B)=∅. That         is, the set of locations of the origin of B as B is moved around         in a fixed orientation such that A and B do not “touch” and         their interiors do not overlap.     -   Boundary(C) contains all points defined by the location of         Origin(B) for all positionings of B, while maintaining the         position of A and the orientations of both A and B, such that         Boundary(A)∩ Boundary(B)≠∅ and Interior(A) ∩ Interior(B)=∅.That         is, the set of locations of the origin of B as B is moved around         in a fixed orientation such that A and B “touch” and their         interiors do not overlap.

From Definition 9 it can also be observed that the UEBSCA operation is not commutative, that is, in general A{circle around (·)}B≠B{circle around (·)}A  (11)

Now let us consider the interaction between two shapes, A and B, that are PHSs. The shape spectrum of a PHS is a continuous spectrum with exactly one dominant PHS a finite distance from its origin. Further, the conditions for which the UEBSCA between these shapes, A {circle around (·)} B, is “well defined” are when the two PHSs are parallel and facing in opposite directions. Under these conditions a shape C, produced by C=A {circle around (·)} B, is itself a PHS. The normal distance from the origin of C to its defining plane is the sum of the distances between the origin of each shape, A and B, and their corresponding defining plane, as illustrated in FIG. 3 for the two-dimensional case.

For those cases where the defining planes of A and B are not parallel, or are parallel but face in the same direction, the resulting shape, C=A {circle around (·)} B, has an empty exterior set. That is, B would have to be placed an infinite distance from A to avoid overlapping. This circumstance is represented by a shape spectrum for C where all values of the spectrum are infinite.

Going one step further and considering any two convex shapes, A and B, as illustrated by the 2-dimensional example in FIG. 4, C=A {circle around (·)} B is also a convex shape. Further, at any tangent point,

of A and B the tangent PHSs of A and B associated with this point, PHS(A,

) and PHS(B,

), must be parallel and face in opposite directions. The boundary point defined by the position of the origin of B, Origin(B), when B is tangent to A at

is one of the points in the boundary set of C and must lie on a plane parallel to PHS(A,

) and PHS(B,

). Since A, B, and C are convex, this plane does not intersect the interior of C and therefore defines a tangent PHS of C, PHS(C, Origin(B)). The normal distance,

(

), of PHS(C, Origin(B)) from Origin(C) is the sum of the normal distance from the Origin(A) to PHS(A,

),

(

), and the normal distance from the Origin(B) to PHS(B,

),

(

+

). Finally, PHS(C, Origin(B)) faces in the same direction as PHS(A,

). Note that for notational convenience we use

to mean a constant vector all of whose elements equal 180.

From the reasoning outlined above the shape spectrum of C=A {circle around (·)} B can be determined as

(

)=

(A{circle around (·)}B)=

(A)+

(B,

)  (12)

-   and the shape C={circle around (·)} B can be determined as     C=A{circle around (·)}B=     (     (A)+     (B,     ),Origin(A))  (13)

We will now look at the behavior of C=A {circle around (·)} B when both A and B are convex polytopes. First, C is its self a convex polytope. Since convex polytopes have discrete shape spectrums, the finite dominant PHSs of C can be determined directly from the finite dominant PHSs of both A and B. In general, for n-dimensional polytopes, the finite dominant PHSs of C are determined by the interaction of the n−1,n−2, . . . 0 dimensional features of shapes A and B. These features are, in turn, determined through the interaction of the finite dominant PHSs. For two dimensional polytopes (polygons) these features include one dimensional edges and zero dimensional points, or corners, where each edge is defined by the “plane” of a dominant PHS, and each corner is defined by the intersection of two dominant PHS “planes”. Further, if A has m finite dominant PHSs (one corresponding to each of A's facets), and B has n finite dominant PHSs then C has as few a zero finite dominant PHSs and at most m+n finite dominant PHSs. The finite dominant PHSs of C are determined from the interaction of an edge of A and an edge of B, or an edge of A and a corner of B, or an edge of B and a corner of A.

For the two dimensional case, one approach to determining the dominant PHSs of shape C is as follows:

Procedure 1: Represent the DR shape spectrums of A, B, and C as “circular” lists. These lists are organized in increasing order of angle between 0°≦θ<360°, of PHS angle and corresponding PHS normal distance from the origin of the shape. Next, rotate each element of list B by 180°. This can be accomplished by adding 180° to each elements angle and then map any angle greater than or equal to 360° to its equivalent angle between 0°≦θ<360°. For each element in list A see if there is an element in list B with the same angle, φ. If there is, mark the element in B, then add a PHS element to list C whose normal distance is the sum of the normal distances of the corresponding elements of list A and B and whose angle is φ. If there is no element in list B with the angle φ, then we will need to generate the PHS of B associated with φ using the dominant PHS information in list B. To do this, we first need to determine if the missing PHS is finite non-dominant or infinite dominant. If it is infinite dominant, then any new element for list C would also be infinite dominant and would not need to be included in list C. If it is finite non-dominant, then any new element would be finite dominant and would need to be added to list C. To determine which case we are working with, we find the two elements of list B that would be the predecessor and successor elements of the element from list A if it were in list B. We then check to see if these two elements have an angle between them that is less than 180°. If so, then the missing PHS is finite non-dominant and we need to generate a new element in list C for the angle φ. Using linear algebra and trigonometry we can determine

(φ+180°), the normal distance from the origin of B to the plane parallel to the PHS from A that intersects the planes of the two adjacent elements from B. With this distance, we can now generate the new element in C as outlined above. After all elements of list A have been processed, we need to process any of the elements of list B that have not been marked. For each of these elements from list B, we need to generate the missing PHS information in list A and, if necessary, generate new elements in list C as outlined above.

As an example, consider the case illustrated in FIG. 5. In this case, we are interested in determining the dominant PHSs for the UEBSCA between a square and an equilateral triangle as it is moved around the square. FIG. 5A illustrates the square, its DR shape spectrum and circular list representation of that DR shape spectrum. FIG. 5B illustrates the equilateral triangle, its DR shape spectrum and the circular list representation of that DR shape spectrum. FIG. 5C illustrates the triangle, its DR shape spectrum and its circular list representation, after its DR shape spectrum has been rotated 180°. From the DR shape spectrums of FIG. 5A and FIG. 5C, we can see that the dominant PHS's of the UEBSCA will be at 0°, 90°, 180°, 210°, 270°, and 330°. FIG. 5D illustrates the shape of the UEBSCA, its DR shape spectrum, and circular list representation.

We will now look at the most general case for determining the UEBSCA between two shapes, A and B. In particular, we are interested in how to determine A {circle around (·)} B when A can be either convex or non-convex and B can be either convex or non-convex. To do this we will need to first look at the behavior of UEBSCA when it is applied between the unions of shapes. Recall that non-convex shapes can be represented as the union of a possible infinite number of convex shapes. Because of this either, or both, of A and B can be converted into a union of convex shapes. However, in order for this conversion to be useful we will need to look at the behavior of UEBSCA when it is applied between the unions of shapes.

From Definitions 3 and 9 we have that Interior((A ₁ ∪A ₂){circle around (·)}B)=Interior((A ₁ {circle around (·)}B)∪(A ₂ {circle around (·)}B))  (14)

-   and by extension     Interior((∪_(i=1,n) A _(i)){circle around     (·)}B)=Interior(∪_(i=1,n)(A _(i) {circle around (·)}B))  (15) -   However, in general     Interior(A{circle around (·)}(B ₁ ∪B ₂))≠Interior((A{circle around     (·)}B ₁)∪(A{circle around (·)}B ₂))  (16) -   This is due to the fact that B₁ and B₂ may not share a common     origin. However, if B₁ and B₂ share a common origin,     Origin(B₁)=Origin(B₂), then     Interior(A{circle around (·)}(B ₁ ∪B ₂))=Interior((A{circle around     (·)}B ₁)∪(A{circle around (·)}B ₂))  (17) -   and by extension     Interior (A{circle around (·)}(∪_(j=1,m) B     _(j)))=Interior(∪_(j=1,m)(A{circle around (·)}B _(j)))  (18) -   Substituting A=∪_(i=1,n)A_(i) into Equation (18) we have     Interior((∪_(i=1,n) A _(i)){circle around (·)}(∪_(j=1,m) B     _(j)))=Interior(∪_(j=1,m)((∪_(i=1,n) A _(i)){circle around (·)}B     _(j)))  (19) -   Based on Equation (15) and Equation (19) we have     Interior((∪_(i=1,n) A _(i)){circle around (·)}(∪_(j=1,m) B     _(j)))=Interior(∪_(j=1,m)(∪_(i=1,n)(A _(i) {circle around (·)}B     _(j))))  (20) -   or, more concisely,

$\begin{matrix} {{{Interior}\mspace{14mu}\left( {\left( {\bigcup_{{i = 1},n}A_{i}} \right) \odot \left( {\bigcup_{{j = 1},m}B_{j}} \right)} \right)} = {{Interior}\mspace{14mu}\left( {\bigcup_{\underset{{j = 1},m}{{i = 1},n}}\left( {A_{i} \odot B_{j}} \right)} \right)}} & (21) \end{matrix}$

-   when Origin(∪_(j=1,m)B_(j))=Origin(B₁)= . . . =Origin(B_(m)).

With this result and the fact that non-convex shapes can be represented as the union of a possible infinite number of convex shapes we have the necessary tools to determine the UEBSCA between two shapes, A and B, regardless of their convexity.

Procedure 2: Decompose A into a set of convex shapes, {A₁, . . . A_(n)}, such that A=∪_(i=1,n)A_(i). Decompose B into a set of convex shapes, {B₁, . . . B_(m)}, where Origin(B₁)= . . . =Origin(B_(m))=Origin(B) and B=∪_(j=1,m)B_(j). From these two sets of shapes the UEBSCA between A and B can be determined as

$\begin{matrix} {{A \odot B} = {\bigcup_{\underset{{j = 1},m}{{i = 1},n}}\left( {A_{i} \odot B_{j}} \right)}} & (22) \end{matrix}$

For completeness, it should also be noted that in general {circle around (·)} is not distributive over ∩. That is, in general

$\begin{matrix} {{{Interior}\mspace{14mu}\left( {\left( {\bigcap_{{i = 1},n}A_{i}} \right) \odot \left( {\bigcap_{{j = 1},m}B_{j}} \right)} \right)} \neq {{Interior}\left( {\bigcap_{\underset{{j = 1},m}{{i = 1},n}}\left( {A_{i} \odot B_{j}} \right)} \right)}} & (23) \end{matrix}$ One notable and important specific case where {circle around (·)} is distributive over ∩ is for the case where all A_(i) and B_(j), are axis aligned orthotopes such that all B_(j), share a common origin.

We will now look at how to determine the UIBSCA between two fixed orientation shapes. To do this, we first need to clearly define the UIBSCA between two fixed orientation shapes, as well as the inversion operation on a shape.

Definition 10: The unconstrained interior boundary surface of closest approach (UIBSCA) between two fixed orientation shapes A and B, A {circle around (·)} B, is a new shape, C, where Origin(C)=Origin(A) and Subdivision(C) is selected such that:

-   -   Interior(C) contains all points defined by the location of         Origin(B) for all positionings of B, while maintaining the         position of A and the orientations of both A and B, such that         Interior(B) ∩ Exterior(A)=∅ and Boundary(A) ∩ Boundary(B)=∅.         That is, the set of locations of the origin of B as B is moved         around in a fixed orientation such that A and B don't “touch”         and the interior of B does not overlap the exterior of A.     -   Exterior(C) contains all points defined by the location of         Origin(B) for all positionings of B, while maintaining the         position of A and the orientations of both A and B, such that         Interior(B) ∩ Exterior(A) ≠∅. That is, the set of locations of         the origin of B as B is moved around in a fixed orientation such         that the interior of B overlaps the exterior of A.     -   Boundary(C) contains all points defined by the location of         Origin(B) for all positionings of B, while maintaining the         position of A and the orientations of both A and B, such that         Boundary(A) ∩ Boundary(B)≠∅ and Interior(B) n Exterior(A)=∅.         That is, the set of locations of the origin of B as B is moved         around in a fixed orientation such that A and B “touch” and the         interior of B does not overlap the exterior of A.

-   From Definition 10 it can also be observed that the UIBSCA operation     is not commutative, that is, in general     A⊚B≠B⊚A  (24)

Definition 11: The inversion of a shape A, Ā, produces a new shape, C, where Origin(C)=Origin(A) and Subdivision(C) is selected such that Interior(C)=Exterior(A) Exterior(C)=Interior(A) Boundary(C)=Boundary(A)  (25)

Using this in combination with the Definitions 9 and 10 we have that A⊚B=Ā{circle around (·)}B  (26)

-   From this we see that A ⊚ B can be solved using all the machinery     developed to solve A {circle around (·)} B.     Analytical Shape Functions

Now that we have a way to determine the shape of UEBSCA or UIBSCA between a pair of shapes, we need an analytical representation for these boundary shapes.

Definition 12: The analytical shape function or, for brevity, shape function,

(

), for a shape S is a mapping which can be used to determine if a point

is in the Interior(S), Exterior(S), or Boundary(S) when Origin(S)=

One approach to this mapping is to define

(

) for a shape S such that: Interior(S)={

|0≦

(

)<1}  (27) Boundary(S)={

|

(

)=1}  (28) Exterior(S)={

|

(

)>1}  (29)

As an example, consider the two-dimensional shape which is a circle of radius one with its origin,

$\begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix},$ located at the center of the circle. An analytical shape function defined on the Cartesian coordinate system that represents this shape and satisfies Equations (27), (28), and (29) is

$\begin{matrix} {{{\mathbb{S}}\left( {\begin{bmatrix} x_{1} \\ x_{2} \end{bmatrix},\begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix}} \right)} = {\left( {x_{1} - o_{1}} \right)^{2} + \left( {x_{2} - o_{2}} \right)^{2}}} & (30) \end{matrix}$

One skilled in the art will immediately see that there are many equally valid alternate mappings that can define a shape function, as for example the mapping Interior(S)={

|

(

)>1}  (31) Boundary(S)={

|

(

)=1}  (32) Exterior(S)={

|0≦

(

)<1}  (33)

-   or     Interior(S)={     |     (     )<0}  (34)     Boundary(S)={     |     (     )=0}  (35)     Exterior(S)={     |     (     )>0}  (36)

For the remainder of this disclosure when a specific mapping is required to illustrate a concept we will assume, for the sake of brevity and clarity and without loss of generality, that the shape functions are defined by the mapping of Equations (27), (28), and (29) unless stated otherwise. One skilled in the art will immediately see that these concepts could be demonstrated with many other alternate mappings or, where applicable, combinations of alternate mappings.

Analytical Composition of Shapes

Since UEBSCAs and UIBSCAs can be composed of multiple shapes using intersections, unions and inversions, we also need analytical methods for composing analytical shape functions using analytical intersections, inversions and unions. We will refer to the process of constructing analytical shape functions using analytical intersections and/or analytical unions as analytical composition.

Definition 13: An analytical intersection for a set of analytical shape functions, {

(

), . . .

(

)}, for the set of shapes {S₁, . . . S_(n)}, Intersect (

(

), . . .

(

)), is a function that can be used to determine if a point is in interior(∩_(i=1,n)S_(i)), Exterior(∩_(i,n)S_(i)), or Boundary(∩_(i=1,n)S_(i)) when Origin(S₁)=

. . . Origin(S_(n))=

One function that captures the spirit of Definition 13 that can perform an approximate analytical intersection for a set of shape functions is

$\begin{matrix} {{{Intersect}\mspace{14mu}\left( {{{\mathbb{S}}_{1}\left( {\overset{\rightharpoonup}{X},{\overset{\rightharpoonup}{O}}_{1}} \right)},{\ldots\mspace{14mu}{{\mathbb{S}}_{n}\left( {\overset{\rightharpoonup}{X},{\overset{\rightharpoonup}{O}}_{m}} \right)}}} \right)} \approx {\lim\limits_{U_{1},{{\ldots\mspace{14mu} U_{m}}->\infty}}\left( {{{\mathbb{S}}_{1}\left( {\overset{\rightharpoonup}{X},{\overset{\rightharpoonup}{O}}_{1}} \right)}^{U_{1}} + \ldots + {{\mathbb{S}}_{m}\left( {\overset{\rightharpoonup}{X},{\overset{\rightharpoonup}{O}}_{m}} \right)}^{U_{m}}} \right)}} & (37) \end{matrix}$

-   The characteristics that cause this to be an approximation stem from     the fact that for any point,     on the boundary of more than one shape of the intersection, we would     expect that point to be on the boundary of the shape formed by the     intersection, however, from Equation (37) we see that     will be mapped to a point in the exterior of the intersection.     However, in practice, for large finite values of {∩₁, . . . ∩_(m)},     the resulting sets will be sufficiently close to the desired sets     for engineering purposes.

Definition 14: An analytical inversion of an analytical shape function,

(

), for the shape S is a function, Invert(

(

)), that can be used to determine if a point is in the Interior( S), Exterior( S), or Boundary( S) when Origin(S)=

One function that satisfies Definition 14 is

$\begin{matrix} {{{Invert}\mspace{14mu}\left( {{\mathbb{S}}\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)} \right)} = \frac{1}{{\mathbb{S}}\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)}} & (38) \end{matrix}$

Definition 15: An analytical union of a set of analytical shape functions, {

(

), . . .

(

)}, for the set of shapes {S₁, . . . S_(n)}, Union(

(

), . . .

(

)), is a function that can be used to determine if a point is in interior(∩_(i=1,n)S_(i)), Exterior(∩_(i=1,n)S_(i)), or Boundary(∩_(i=1,n)S_(i)) when Origin(S₁)=

. . . Origin(S_(n))=

Using DeMorgan's law and assuming Definitions 13 and 14 are satisfied using Equations (37) and (38), one function that captures the spirit of Definition 15 and can perform an approximate analytical union for a set of shape functions is

$\begin{matrix} {{{Union}\mspace{14mu}\left( {{{\mathbb{S}}_{1}\left( {\overset{\rightharpoonup}{X},{\overset{\rightharpoonup}{O}}_{1}} \right)},{\ldots\mspace{14mu}{{\mathbb{S}}_{n}\left( {\overset{\rightharpoonup}{X},{\overset{\rightharpoonup}{O}}_{n}} \right)}}} \right)} = {{{Invert}\mspace{14mu}\left( {{Intersect}\mspace{14mu}\left( {{{Invert}\mspace{14mu}\left( {{\mathbb{S}}_{1}\left( {\overset{\rightharpoonup}{X},{\overset{\rightharpoonup}{O}}_{1}} \right)} \right)},{\ldots\mspace{14mu}{Invert}\mspace{14mu}\left( {{\mathbb{S}}_{n}\left( {\overset{\rightharpoonup}{X},{\overset{\rightharpoonup}{O}}_{n}} \right)} \right)}} \right)} \right)} \approx \frac{1}{\lim\limits_{R_{1},{{\ldots\mspace{14mu} R_{n}}->\infty}}\left( {\frac{1}{{{\mathbb{S}}_{1}\left( {\overset{\rightharpoonup}{X},{\overset{\rightharpoonup}{O}}_{1}} \right)}^{R_{1}}} + \ldots + \frac{1}{{{\mathbb{S}}_{n}\left( {\overset{\rightharpoonup}{X},{\overset{\rightharpoonup}{O}}_{n}} \right)}^{R_{n}}}} \right)}}} & (39) \end{matrix}$

-   Again we note the approximate nature of Equation (39) and observe     that, in practice, for large finite values of {R₁, . . . , R_(n)}     the resulting sets will be sufficiently close to the desired sets     for engineering purposes.

There are shape functions whose form makes its associated exponent, in Equations (37) or (39), unnecessary. For example, if the shape function

$\begin{matrix} {{{\mathbb{S}}_{1}\left( {\begin{bmatrix} x_{1} \\ x_{2} \end{bmatrix},\begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix}} \right)} = {\lim_{Q->\infty}\left( {{{x_{1} - o_{1}}}^{Q} + {{x_{2} - o_{2}}}^{Q}} \right)}} & (40) \end{matrix}$

-   were one of the shapes to be intersected in Equation (37) or the     union in Equation (38), the behavior of exponent Q would make the     associated exponent in Equations (37) or (39), unnecessary and the     exponent could either be eliminated or set to a constant.     Conversely, if the shape function

$\begin{matrix} {{{\mathbb{S}}_{1}\left( {\begin{bmatrix} x_{1} \\ x_{2} \end{bmatrix},\begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix}} \right)} = {{{x_{1} - o_{1}}}^{2} + {{x_{2} - o_{2}}}^{2}}} & (41) \end{matrix}$

-   were one of the shapes to be intersected in Equation (37) or the     union in Equation (38), its associated exponent in Equations (37) or     (39), would be required. We will refer to shapes, such as the one in     Equation (40), as self-composing shapes. From this we can see that     shapes produced by an analytic union or analytic intersection are     themselves self-composing.     Constructing Analytical Shape Functions

Since shapes can be composed of set of convex shapes we now need methods for constructing analytical shape functions for convex shapes.

One method for constructing analytical shape functions for convex shapes relies on the fact that convex shapes are composed of the intersection of a possibly infinite number of PHSs. Further, the finite dominant PHSs of a shape's shape spectrum identify the minimum set of PHSs that will need to be intersected to form the shape. From this we can see that an analytical shape function of a convex shape can be composed from the analytical shape functions of its finite dominant PHSs.

One approach to determining an analytical shape function of a PHS that satisfies Equations (27), (28), and (29) is through the use of affine functions. In particular, for the PHS, PHS1, associated with direction

of an n-dimensional convex shape, S, with origin

we can construct a function P

(

), which is affine in

such that P

(

)=1 for all

on the boundary of PHS1 and P

(

)>1 for all

exterior to PHS1. To do this we need to determine a vector of n coefficients,

and a scalar K

which satisfy P

(

)=

+K

=1∀

εBoundary(PHS1)  (42) P

(

)=

+K

>1∀

εExterior(PHS1)  (43)

-   Using basic linear algebra and trigonometry it is possible to     determine any number of     and K     that satisfy Equation (42) and (43).

For example, in the 2-dimensional case it is not hard to show that

$\begin{matrix} {{\overset{\rightharpoonup}{K}}_{\overset{\rightharpoonup}{\theta}} = \begin{bmatrix} {\cos\;\theta} \\ {\sin\;\theta} \end{bmatrix}} & (44) \\ {K_{\overset{\rightharpoonup}{\theta}} = {{- {{\overset{\rightharpoonup}{K}}_{\overset{\rightharpoonup}{\theta}}^{T}\begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix}}} - {(\theta)} + 1}} & (45) \end{matrix}$

-   satisfy Equations (42) and (43) when     (θ) is the normal distance from

$\overset{\rightharpoonup}{O} = \begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix}$ to the plane of PHS1 of S.

However, while P

(

) will correctly identify the boundary and exterior sets, it will not correctly identify the interior set since it maps all points,

in the interior of PHS1 to values in the range −∞<P

(

)<)1 instead of the desired range 0≦P

(

)<)1. One way to rectify this is to define the analytical shape function for PHS1 to be

(

)=max{0, P

(

)}  (46)

Using Equations (37) and (46), we can construct an analytical shape function for a convex shape, S, with a discrete shape spectrum having q finite dominant PHS's with directions

as

$\begin{matrix} {{{\mathbb{S}}\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)} = {\lim\limits_{Z_{1},{{\ldots\mspace{14mu} Z_{q}}->\infty}}\left( {\sum\limits_{i = 1}^{q}{{\mathbb{P}}_{{\overset{\rightharpoonup}{\theta}}_{i}}\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)}^{Z_{i}}} \right)}} & (47) \end{matrix}$

Equation (47) can produce a shape function which maps more than one point in the interior of the shape to a value of zero due to the use of the max function in Equation (46). In some applications it may be desirable for the shape function to have only a single point in the interior of a shape which maps to a value of zero. One way to produce a shape function with a unique minimum point, possibly zero, for a convex shape, S, having finite volume, is to first determine a point in the interior of the shape. One such point, the analytical center, can be readily determined using convex optimization methods. We can then compute the vector of coefficients and scalar in Equations (42) and (43) such that the shape function for each PHS of S passes through this point with a value greater than or equal to zero. If the shape function of each PHS of S passes through this point with a value of zero, then the corresponding shape function of S will have a unique minimum at this point whose value is zero.

A more compact representation exists for any n-dimensional convex shape, S, that has symmetric pairs of finite dominate PHSs. A symmetric pair of finite dominant PHSs for a shape S exists when there is a finite dominant PHS, call it PHS1, for some direction

and another finite dominant PHS, call it PHS2, for direction

+

Under these circumstances we can construct a single affine function,

(

), which can be used to capture the interior, boundary, and exterior sets of PHS1 ∩ PHS2. In particular, we can determine a vector of n coefficients,

and a scalar K

that satisfy

(

)=

+

=1∀

εBoundary(PHS1)  (48)

(

)=

+K

>1∀

εExterior(PHS1)  (49)

(

)=

+

=−1∀

εBoundary(PHS2)  (50)

(

)=

+

<−1∀

εExterior(PHS2)  (51) −1<

(

)=

+

<1∀

ε(Interior(PHS1)∩Interior(PHS2))  (52)

-   The analytical representation of the intersection of PHS1 and PHS2     can then be compactly represented as     (     =|Q     (     )|  (53) -   For example, in the 2-dimensional case it is not hard to show that

$\begin{matrix} {{\overset{\rightharpoonup}{K}}_{\overset{\rightharpoonup}{\theta}} = {\frac{2}{{\mathcal{S}\left( {\theta + {180{^\circ}}} \right)} + {\mathcal{S}(\theta)}}\begin{bmatrix} {\cos\mspace{11mu}\theta} \\ {\sin\mspace{11mu}\theta} \end{bmatrix}}} & (54) \\ {K_{\overset{\rightharpoonup}{\theta}} = {{- {{\overset{\rightharpoonup}{K}}_{\overset{\rightharpoonup}{\theta}}^{T}\begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix}}} + \frac{{\mathcal{S}\left( {\theta + {180{^\circ}}} \right)} - {\mathcal{S}(\theta)}}{{\mathcal{S}\left( {\theta + {180{^\circ}}} \right)} + {\mathcal{S}(\theta)}}}} & (55) \end{matrix}$

-   where

$\quad\begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix}$

-   is the origin of S, and by extension the origins of both PHS1 and     PHS2; θis the direction of the normal vector form

$\quad\begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix}$

-   to the plane of PHS1 of S;     (θ) is the normal distance from

$\quad\begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix}$

-   to the plane of PHS1 of S; and     (θ+180°) is the normal distance from

$\quad\begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix}$

-   to the plane of PHS2 of S.

One way to use Equations (46) and (53) to construct an analytical representation for a convex shape, S, with a discrete shape spectrum having r finite dominant PHSs is as

$\begin{matrix} {{{\mathbb{S}}\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)} = {\lim\limits_{\underset{Z_{q + 1},{{\ldots\mspace{14mu} Z_{q + p}}->\infty}}{Z_{1},{{\ldots\mspace{14mu} Z_{q}}->\infty}}}\left( {{\sum\limits_{i = 1}^{q}{{\mathbb{Q}}_{{\overset{\rightharpoonup}{\theta}}_{i}}\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)}^{Z_{i}}} + {\sum\limits_{j = 1}^{p}{{\mathbb{P}}_{{\overset{\rightharpoonup}{\vartheta}}_{j}}\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)}^{Z_{q + j}}}} \right)}} & (56) \end{matrix}$

-   wherein p and q are integers;

${0 \leq q \leq \frac{r}{2}};$

-   at least q PHS's, with directions     have corresponding symmetric PHSs with directions     +     +     the remaining p=r−2q finite dominant PHS's have directions

For a convex shape, S, with a continuous shape spectrum the summation in Equation (56) can be converted to an integration. As an example of this, consider the two dimensional case where the shape spectrum,

(θ), is symmetric. One way to determine this shape function is as

$\begin{matrix} {{{\mathbb{S}}\left( {\begin{bmatrix} x_{1} \\ x_{2} \end{bmatrix},\begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix}} \right)} = {{\lim\limits_{Z->\infty}\left( {\int_{0{^\circ}}^{180{^\circ}}{{{\mathbb{Q}}_{\theta}\left( {\begin{bmatrix} x_{1} \\ x_{2} \end{bmatrix},\begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix}} \right)}^{Z}{\mathbb{d}\theta}}} \right)} = {\quad{{{\quad\quad}{\lim\limits_{Z->\infty}\left( {\int_{0{^\circ}}^{180{^\circ}}{{{{{{\overset{\rightharpoonup}{K}}_{\theta}}^{T}\begin{bmatrix} x_{1} \\ x_{2} \end{bmatrix}} + K_{\theta}}}^{Z}{\mathbb{d}\theta}}} \right)}} = {\lim\limits_{Z->\infty}\left( {\int_{0{^\circ}}^{180{^\circ}}{{\begin{matrix} {{\frac{2\;\cos\;(\theta)}{{\mathcal{S}(\theta)} + {\mathcal{S}\left( {\theta + {180{^\circ}}} \right)}}x_{1}} +} \\ {{\frac{2\;{\sin(\theta)}}{{\mathcal{S}(\theta)} + {\mathcal{S}\left( {\theta + {180{^\circ}}} \right)}}x_{2}} +} \\ \frac{{{- 2}\;{\cos(\theta)}o_{1}} - {2\mspace{11mu}{\sin(\theta)}o_{2}} + {\mathcal{S}\left( {\theta + {180{^\circ}}} \right)} - {\mathcal{S}(\theta)}}{{\mathcal{S}(\theta)} + {\mathcal{S}\left( {\theta + {180{^\circ}}} \right)}} \end{matrix}}^{Z}{\mathbb{d}\theta}}} \right)}}}}} & (57) \end{matrix}$

We will now consider a more direct approach to constructing analytical shape functions for convex shapes. In this approach, an analytical shape function is generated directly from a shape spectrum without the use of PHSs. We will illustrate this approach using the two-dimensional case. Specifically, it can be shown that for a two-dimensional shape S with origin

$\overset{\rightharpoonup}{O} = \begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix}$

-   and shape spectrum     (θ)=     (S), the boundary of S can be determined as     Boundary(S)=∩_(0°≦θ<360°) L(θ,     )  (58) -   where L(θ,     ) is the set of points defined by the line segment between the     points

$\overset{\rightharpoonup}{A} = {{\begin{bmatrix} {a_{1}\left( {\theta,o_{1}} \right)} \\ {a_{2}\left( {\theta,o_{2}} \right)} \end{bmatrix}\mspace{14mu}{and}\mspace{14mu}\overset{\rightharpoonup}{B}} = \begin{bmatrix} {b_{1}\left( {\theta,o_{1}} \right)} \\ {b_{2}\left( {\theta,o_{2}} \right)} \end{bmatrix}}$ where  a₁(θ, o₁),  a₂(θ, o₂),  b₁(θ, o₁), and  b₂(θ, o₂)

-   are defined by the following subdifferential equations:

$\begin{matrix} {{a_{1}\left( {\theta,o_{1}} \right)} = {{{\mathcal{S}(\theta)}{\cos(\theta)}} - {{\sin(\theta)}\max\left\{ \frac{{\delta\mathcal{S}}(\theta)}{\delta\theta} \right\}} + o_{1}}} & (59) \\ {{a_{2}\left( {\theta,o_{2}} \right)} = {{{\mathcal{S}(\theta)}{\sin(\theta)}} + {\cos\;(\theta)\max\left\{ \frac{{\delta\mathcal{S}}(\theta)}{\delta\theta} \right\}} + o_{2}}} & (60) \\ {{b_{1}\left( {\theta,o_{1}} \right)} = {{{\mathcal{S}(\theta)}{\cos(\theta)}} - {{\sin(\theta)}\min\left\{ \frac{{\delta\mathcal{S}}(\theta)}{\delta\theta} \right\}} + o_{1}}} & (61) \\ {{b_{2}\left( {\theta,o_{2}} \right)} = {{{\mathcal{S}(\theta)}{\sin(\theta)}} + {{\cos(\theta)}\min\left\{ \frac{{\delta\mathcal{S}}(\theta)}{\delta(\theta)} \right\}} + o_{2}}} & (62) \end{matrix}$

-   where

$\frac{{\delta\mathcal{S}}(\theta)}{\delta\theta}$

-   is the set of subderivatives of     (θ) at θ. Further, as illustrated in FIG. 6, for each point

$\overset{\rightharpoonup}{P} = \begin{bmatrix} p_{1} \\ p_{2} \end{bmatrix}$

-   in Boundary(S) there are two associated angles. The first, θ, has     already been defined according to Equation (58). The second, φ, is     defined as the angle formed between a vector from     to     and a vector parallel to the X-axis originating at     The relationship between θ and φ satisfies the following     subdifferential inequality:

$\begin{matrix} {{\theta + {\tan^{- 1}\left( \frac{\min\left\{ \frac{{\delta\mathcal{S}}(\theta)}{\delta\theta} \right\}}{\mathcal{S}(\theta)} \right)}} \leq \varphi \leq {\theta + {\tan^{- 1}\left( \frac{\max\left\{ \frac{{\delta\mathcal{S}}(\theta)}{\delta\theta} \right\}}{\mathcal{S}(\theta)} \right)}}} & (63) \end{matrix}$

-   For a shape S with a continuous shape spectrum, Origin(S) ε     Interior(S), and for which Boundary(S) contains no straight line     segments, the set of subderivatives,

$\frac{{\delta\mathcal{S}}(\theta)}{\delta\theta},$

-   associated with each θcontains a single element

$\begin{matrix} {\frac{{\delta\mathcal{S}}(\theta)}{\delta\theta} = \left\{ \frac{\partial{\mathcal{S}(\theta)}}{\partial\theta} \right\}} & (64) \end{matrix}$

-   and thus

$\begin{matrix} {\theta = {\varphi - {\tan^{- 1}\left( \frac{\frac{\partial{\mathcal{S}(\theta)}}{\partial\theta}}{\mathcal{S}(\theta)} \right)}}} & (65) \\ {{a_{1}\left( {\theta,o_{1}} \right)} = {{b_{1}\left( {\theta,o_{1}} \right)} = {{{\mathcal{S}(\theta)}{\cos(\theta)}} - {{\sin(\theta)}\frac{\partial{\mathcal{S}(\theta)}}{\partial\theta}} + o_{1}}}} & (66) \\ {{a_{2}\left( {\theta,o_{2}} \right)} = {{b_{2}\left( {\theta,o_{2}} \right)} = {{{\mathcal{S}(\theta)}{\sin(\theta)}} + {{\cos(\theta)}\frac{\partial{\mathcal{S}(\theta)}}{\partial\theta}} + o_{2}}}} & (67) \end{matrix}$

-   In this case, as illustrated in FIG. 6, an analytical shape function     for S, satisfying

Equations (27) though (29), can be constructed as:

$\begin{matrix} \begin{matrix} {{{\mathbb{S}}\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)} = {\frac{{\overset{\rightharpoonup}{X} - \overset{\rightharpoonup}{O}}}{{\overset{\rightharpoonup}{P} - \overset{\rightharpoonup}{O}}} = \frac{\sqrt{\left( {x_{1} - o_{1}} \right)^{2} + \left( {x_{2} - o_{2}} \right)^{2}}}{\sqrt{\left( {p_{1} - o_{1}} \right)^{2} + \left( {p_{2} - o_{2}} \right)^{2}}}}} \\ {= \sqrt{\frac{\left( {x_{1} - o_{1}} \right)^{2} + \left( {x_{2} - o_{2}} \right)^{2}}{\left( {p_{1} - o_{1}} \right)^{2} + \left( {p_{2} - o_{2}} \right)^{2}}}} \end{matrix} & (68) \end{matrix}$

-   where

${\overset{\rightharpoonup}{X} = \begin{bmatrix} x_{1} \\ x_{2} \end{bmatrix}};{\overset{\rightharpoonup}{O} = \begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix}};{\overset{\rightharpoonup}{P} = \begin{bmatrix} p_{1} \\ p_{2} \end{bmatrix}};$

-   θ satisfies Equation (65) when

${\varphi\; = {\tan^{- 1}\left( \frac{x_{2} - o_{2}}{x_{1} - o_{1}} \right)}};$

-   and, based on Equations (66) and (67), p₁=α₁(θ, o₁) and p₂=α₂(θ,     o₂).     Analytical Representations of BD Constraints

We will now consider an approach to generating analytical representations for a wide variety of BD constraints. To begin with, simple BD constraints between the exterior surfaces of two shapes, S₁ and S₂, can be constructed with the use of UEBSCA, or EB=S₁ {circle around (·)} S₂, while simple BD constraints between the exterior surface of one shape and the interior surface of another can be constructed with the use of UIBSCA, or IB=S₁ ⊚ S₂. Further, we can break these two categories into at least three sub types: non-overlap, abutment and overlap constraints between the boundary surfaces of S₁ and S₂. One way we can generate an analytical representation for a BD constraint that can be used to determine if the exterior surfaces of S₁ and S₂ abut, Boundary(S₁) ∩ Boundary(S₂)≠∅ and Interior(S₁) ∩ Interior(S₂)=∅, is by generating a shape function for EB,

(

Origin(S₁)), and checking to see if Origin(S₂) is in Boundary(EB) using the equality constraint

(Origin(S ₂),Origin(S ₁))=1  (69)

-   or an equivalent such as     (Origin(S₂)−Origin(S_(i)),     )=1, where     is a vector where all components are zero. In a similar fashion, one     way we can determine that the non-overlap constraint Exterior(S₁) ∩     Exterior(S₂)=∅ between S₁ and S₂ is satisfied, is by checking to see     if Origin(S₂) is in Exterior(EB) using     (Origin(S ₂),Origin(S ₁))>1  (70) -   or an equivalent. Likewise, one way we can determine that the     overlap constraint Interior(S₁) n Interior(S₂)≠∅ between S₁ and S₂     is satisfied is by checking to see if Origin(S₂) is in Interior(EB)     using     (Origin(S ₂),Origin(S ₁))<1  (71) -   or an equivalent.

Extending these ideas to containment constraints between S₁ and S₂ we have

(Origin(S ₂),Origin(S ₁))=1  (72)

(Origin(S ₂),Origin(S ₁))>1  (73)

(Origin(S ₂),Origin(S ₁))<1  (74)

-   where Equations (72) verify abutment between the interior surface of     S₁ and the exterior surface of S₂, Boundary(S₁) ∩ Boundary(S₂)≠∅ and     Interior(S₂) ⊂ Interior(S₁); Equations (73) verify the overlap     constraint Exterior(S₁) ∩ Interior(S₂)≠∅ between S₁ and S₂; and     Equations (74) verify the containment constraint Exterior(S₂) ⊂     Interior(S₁) between S₁ in S₂.     Distance Spectrums

To broaden the range of BD constraints that can be checked we need to be able to determine EBSCA and IBSCA which account for nonzero distance constraints between surfaces. That is, we need to be able to determine CEBSCA and CIBSCA. One way to do this is through the use of distance spectrums.

Definition 17: A distance spectrum,

(

), is a function whose values represent the adjustments to be made in the distance values of a shape's shape spectrum. Associated with a shape spectrum and a distance spectrum are two operations, ⊕ and ⊖, where ⊕ “adds” a distance spectrum to a shape spectrum, and e “subtracts” a distance spectrum from a shape spectrum. Further, one or more values of direction

can have a value of

(

) which is undefined. We will refer to distance spectrums with no undefined values as explicit distance spectrums and those with one or more undefined values as implicit distance spectrums. For a shape spectrum

(

) and a distance spectrum

(

), the shape spectrums

(

) ⊕

(

) and

(

) ⊖

(

) can be determined as follows:

-   -   For all         which have defined values for         (         ),         (         ) ⊕         (         )=         (         )+         (         ), and         (         ) ⊖         (         )=         (         )−         (         ).     -   If, for a given         D(         ) is undefined and         (         ) is associated with a dominant PHS then         (         ) ⊕         (         )=         (         ), and         (         ) ⊖         (         )=         (         ).     -   If, for a given         ,         (         ) is undefined and         (         ) is associated with a non-dominant PHS then the values of         (         ) ⊕         (         ), and         (         ) ⊖         (         ) are selected such that the PHS associated with         (         ) is also non-dominant.

One way to determine CEBSCA of two shapes, S₁ and S₂, with additional distance constraints captured as distance spectrums,

(

) and

(

), would be as follows EB=

(

(S ₁⊕

(

),Origin(S ₁)){circle around (·)}

(

(S ₂)⊕

(

),Origin(S ₂))  (75)

-   when both operands of the {circle around (·)} operation are convex     shapes. From this we can determine the shape spectrum, ε     (     ), of EB as     ε     (     )=     (     )⊕     (     )+     (     +     )⊕     +     )  (76) -   When     (     ) and     (     ) are both explicit distance spectrums Equation (76) reduces to

$\begin{matrix} \begin{matrix} {{{\mathcal{E}\mathcal{B}}\left( \overset{\rightharpoonup}{\theta} \right)} = {{\mathcal{S}_{1}\left( \overset{\rightharpoonup}{\theta} \right)} + {\mathcal{D}_{1}\left( \overset{\rightharpoonup}{\theta} \right)} + {\mathcal{S}_{2}\left( {\overset{\rightharpoonup}{\theta} + \overset{\rightharpoonup}{180}} \right)} + {\mathcal{D}_{2}\left( {\overset{\rightharpoonup}{\theta} + \overset{\rightharpoonup}{180}} \right)}}} \\ {= {{\mathcal{S}_{1}\left( \overset{\rightharpoonup}{\theta} \right)} + {\mathcal{S}_{2}\left( {\overset{\rightharpoonup}{\theta} + \overset{\rightharpoonup}{180}} \right)} + {\mathcal{D}_{3}\left( \overset{\rightharpoonup}{\theta} \right)}}} \end{matrix} & (77) \end{matrix}$

-   where     (     )=     (     )+     (     +     ). -   More generally, for the case where one or both of shapes S₁ and S₂     are non-convex we can represent the non-convex shape as the union of     a set of convex shapes. Specifically, when both of shapes S₁ and S₂     are non-convex we assume that S₁=∪_(i=1,m)S_(1,i) and     S₂=∪_(j=1,n)S_(2,j) where S_(1,1) . . . S_(1,m) and S_(2,1), . . .     S_(2, n) are all convex shapes and Origin(S₂)=Origin(s_(2,1))= . . .     =Origin(S_(2,n)). Applying Equations (21) and (75) we can     incorporate distance spectrums     (     ), . . .     (     ) and     (     ), . . .     (     ) into the determination of the CEBSCA of S₁ and S₂ as

$\begin{matrix} {{EB} = {\bigcup\limits_{\underset{{j = 1},n}{{i = 1},m}}\begin{pmatrix} {{\mathcal{T}^{- 1}\left( {{{\mathcal{T}\left( S_{1,i} \right)} \oplus {\mathcal{D}_{1,i}\left( \overset{\rightharpoonup}{\theta} \right)}},\mspace{14mu}{{Origin}\left( S_{1,i} \right)}} \right)} \odot} \\ {\mathcal{T}^{- 1}\left( {{{\mathcal{T}\left( S_{2,j} \right)} \oplus {\mathcal{D}_{2,j}\left( \overset{\rightharpoonup}{\theta} \right)}},\mspace{14mu}{{Origin}\left( S_{2,j} \right)}} \right)} \end{pmatrix}}} & (78) \end{matrix}$

-   when both operands of each {circle around (·)} operation are convex     shapes.

From this, it can be seen that complex BD constraints between the exterior surfaces of two shapes can be constructed, in a form similar to one of Equations (69) through (71), with the use of UEBSCA in combination with one or more distance spectrums.

We will now look at one way to use distance spectrums in combination with UIBSCA to form CIBSCA. Specifically, given two shapes, S₁=∪_(i=1,m)S_(1,i) and S₂=∪_(j=1,n)S_(2,j), and two sets of distance spectrums,

(

), . . .

(

) and

(

), . . . D_(2,n)(

) where S_(1,1), . . . S_(1,m) and S_(2,1), . . . S_(2,n) are all convex shapes and Origin(S₂)=Origin(S_(2,1))= . . . =Origin(S_(2,n)), we would like to determine the CIBSCA between the interior surface of S₁ and the exterior surface of S₂. To do this we will again rely on Equation (26) to transform an IBSCA problem into an EBSCA problem. To do this we begin by applying

(

), . . .

(

) to S₁=∪_(i=1,m)S_(1,i) S ₁′=∪_(i=1,m)

(

(S _(1,i))⊖

(

),Origin(S _(1,i)))  (79)

-   then we invert S₁′ and decompose the resulting shape into a union of     convex shapes     S₁ ′=S₃=∪_(k=1,q)S_(3,k)  (80) -   Using this new set of convex shapes, S_(3,1), . . . S_(3,q) we can     form the CIBSCA of S₁ and S₂ as

$\begin{matrix} {{IB} = {{S_{1} \odot S_{2}} = {\bigcup\limits_{\underset{{j = 1},n}{{k = 1},q}}\left( {S_{3,k} \odot {\mathcal{T}^{- 1}\left( {{{\mathcal{T}\left( S_{2,j} \right)} \oplus {\mathcal{D}_{2,j}\left( \overset{\rightharpoonup}{\theta} \right)}},\mspace{14mu}{{Origin}\left( S_{2,j} \right)}} \right)}} \right)}}} & (81) \end{matrix}$

From this, complex BD constraints between the interior surface of one shape and the exterior surface of another can be constructed, in a form similar to one of Equations (72) through (74), with the use of IBSCA in combination with one or more distance spectrums.

Parameterized and Trivial Spectrums

To this point, for the sake of simplicity and clarity, we have focused on “simple spectrums”. That is, shape spectrums and distance spectrums where NO additional parameters are used in the determination of the value returned by the function representing the shape spectrum or distance spectrum for a given direction. We can significantly increase the range of BD constraints that can be represented through the use of shape and distance spectrums with additional parameters, or “parameterized spectrums”. That is, spectrums where additional parameters are used in the determination of the value returned by the function for a given direction. The expanded range of constraints includes, for example, constraints that can also control the size, orientation, or geometry of a shape.

We will refer to any shape or distance spectrum that produces values that are independent of the direction of interest as a “trivial” spectrum. Example of trivial shape spectrums include the simple shape spectrum of the unit circle with its origin located at the center of the circle:

(θ)=1, and the parameterized shape spectrum of a sphere of radius r whose origin is located at the center of the sphere:

${\mathcal{S}\left( {\begin{bmatrix} \theta_{1} \\ \theta_{2} \end{bmatrix},r} \right)} = {r.}$ Axis Aligned Orthotopes

The above development can be significantly simplified for the case where we want to generate an EBSCA or IBSCA for a pair of n-dimensional axis-aligned (AA) orthotopes, whose origins are at the center of their respective shapes, subject to AA orthotopic boundary distance constraints. To do this we take advantage of the following two observations: first, the EBSCA and IBSCA of a pair of AA orthotopes subject to AA orthotopic boundary distance constraints are themselves n-dimensional AA orthotopes; second, the shape of an n-dimensional AA orthotope can be analytically represented using an n-dimensional superellipsoid.

For the sake of clarity and brevity and without loss of generality, we will assume that for an n-dimensional AA orthotope, A, there is an n-dimensional vector,

=[ad₁, . . . ad_(n)]^(T), which contains the dimensions of A as measured along each of the coordinate axes between parallel pairs of faces. One skilled in the art will recognize that the dimensions of all AA orthotopes can be reduced to this form. Taking advantage of the first observation, we see that given two AA orthotopes, A and B, with origins

and

respectively, the dimensions of their UEBSCA, EB, are:

=

+

  (82)

-   as illustrated in FIG. 7A for the two-dimensional case.

Based on the second observation, consider the case of an n-dimensional AA orthotope, C, centered at the origin of the Cartesian coordinates system with dimensions

=[cd₁, . . . cd_(n)]^(T). The boundary of C can be analytically represented, using an n-dimensional superellipsoid, as

$\begin{matrix} {{\lim\limits_{Z_{1},{{\ldots\mspace{14mu} Z_{n}}\rightarrow\infty}}\left( {\sum\limits_{i = 1}^{n}{{2\frac{x_{i}}{{ad}_{i}}}}^{Z_{i}}} \right)} = 1} & (83) \end{matrix}$

-   If we now offset C a distance     =[od₁, . . . od_(n)]^(T), its boundary can be analytically     represented as

$\begin{matrix} {{\lim\limits_{Z_{1},{{\ldots\mspace{14mu} Z_{n}}\rightarrow\infty}}\left( {\sum\limits_{i = 1}^{n}{{2\frac{x_{i} - {od}_{i}}{{cd}_{i}}}}^{Z_{i}}} \right)} = 1} & (84) \end{matrix}$

Combining Equations (82) and (84) with

=

the boundary of the orthotope EB can be analytically represented as

$\begin{matrix} {{\lim\limits_{Z_{1},{{\ldots\mspace{14mu} Z_{n}}\rightarrow\infty}}\left( {\sum\limits_{i = 1}^{n}{{2\frac{x_{i} - {ao}_{i}}{{ad}_{i} + {bd}_{i}}}}^{Z_{i}}} \right)} = 1} & (85) \end{matrix}$

-   or, in terms of a shape function for EB,

$\begin{matrix} {{{\mathbb{E}\mathbb{B}}\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)} = {\lim\limits_{Z_{1},{{\ldots\mspace{14mu} Z_{n}}\rightarrow\infty}}\left( {\sum\limits_{i = 1}^{n}{{2\frac{x_{i} - o_{i}}{{ad}_{i} + {bd}_{i}}}}^{z_{i}}} \right)}} & (86) \end{matrix}$

Again, for the sake of clarity and brevity and without loss of generality, we will assume that for a pair of n-dimensional AA orthotopes, A and B, there is a pair of n-dimensional vectors

and

where

contains the separation distances to be maintained between the “upper faces” of A and the adjacent faces of B and

contains the separation distances to be maintained between the “lower faces” of A and the adjacent faces of B. We define an upper face of A to be a face which intersects a vector, v, extending from

parallel to one of the axes such that v points in the direction of increasing values along that axis, as illustrated in FIG. 7B for vectors v₁ and v₂. We define a lower face of A to be a face that is not an upper face. One skilled in the art will recognize that all AA orthotopic boundary distance constraints between AA orthotopes can be reduced to this form. We can generalize the analytical representation of the UEBSCA developed above to include upper and lower separation distances between A and B. This can be done by observing that the separation distances in effect adjust the origin and dimensions of A. That is, the origin of A is now effectively

$\overset{\rightharpoonup}{AO} + \frac{\overset{\rightharpoonup}{ABU} - \overset{\rightharpoonup}{ABL}}{2}$ and the dimensions of A are now effectively

+

+

as illustrated in FIG. 7B for the two-dimensional case. The resulting analytical representation of the CEBSCA, EB, which accounts for separation distances between A and B is

$\begin{matrix} {{\lim\limits_{Z_{1},{{\ldots\mspace{14mu} Z_{n}}\rightarrow\infty}}\left( {\sum\limits_{i = 1}^{n}{{2\frac{x_{i} - \left( {{ao}_{i} + \frac{{abu}_{i} - {abl}_{i}}{2}} \right)}{{ad}_{i} + {abu}_{i} + {abl}_{i} + {bd}_{i}}}}^{Z_{i}}} \right)} = 1} & (87) \end{matrix}$

-   or, in terms of a shape function for EB,

$\begin{matrix} {{{\mathbb{E}\mathbb{B}}\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)} = {\lim\limits_{Z_{1},{{\ldots\mspace{14mu} Z_{n}}\rightarrow\infty}}\left( {\sum\limits_{i = 1}^{n}{{2\frac{x_{i} - \left( {o_{i} + \frac{{abu}_{i} - {abl}_{i}}{2}} \right)}{{ad}_{i} + {abu}_{i} + {abl}_{i} + {bd}_{i}}}}^{Z_{i}}} \right)}} & (88) \end{matrix}$

In a similar manner, given two AA orthotopes, A and B, with origins

and

respectively, the dimensions of their UIBSCA, IB, are:

=

−

  (89)

-   as illustrated in FIG. 8A for the two-dimensional case.

Combining Equations (84) and (89) with

=

the boundary of the orthotope IB can be analytically represented as

$\begin{matrix} {{\lim\limits_{Z_{1},{{\ldots\mspace{14mu} Z_{n}}\rightarrow\infty}}\left( {\sum\limits_{i = 1}^{n}{{2\frac{x_{i} - {ao}_{i}}{{ad}_{i} - {bd}_{i}}}}^{Z_{i}}} \right)} = 1} & (90) \end{matrix}$

-   or, in terms of a shape function for IB,

$\begin{matrix} {{{\mathbb{I}\mathbb{B}}\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)} = {\lim\limits_{Z_{1},{{\ldots\mspace{14mu} Z_{n}}\rightarrow\infty}}\left( {\sum\limits_{i = 1}^{n}{{2\frac{x_{i} - o_{i}}{{ad}_{i} - {bd}_{i}}}}^{Z_{i}}} \right)}} & (91) \end{matrix}$

Again, we can generalize the analytical representation of the IBSCA developed above to include upper and lower separation distances between A and B by observing that the separation distances in effect adjust the origin and dimensions of A. That is, the origin of A is now effectively

$\overset{\rightharpoonup}{AO} + \frac{\overset{\rightharpoonup}{ABL} - \overset{\rightharpoonup}{ABU}}{2}$ and its dimensions are now effectively

−

−

as illustrated in FIG. 8B for the two-dimensional case. The resulting analytical representation of the CIBSCA, IB, which accounts for separation distances between A and B is

$\begin{matrix} {{\lim\limits_{Z_{1},{{\ldots\mspace{14mu} Z_{n}}\rightarrow\infty}}\left( {\sum\limits_{i = 1}^{n}{{2\frac{x_{i} - \left( {{ao}_{i} + \frac{{abl}_{i} - {abu}_{i}}{2}} \right)}{{ad}_{i} - {abu}_{i} - {abl}_{i} - {bd}_{i}}}}^{Z_{i}}} \right)} = 1} & (92) \end{matrix}$

-   or, in terms of a shape function for IB,

$\begin{matrix} {{{{\mathbb{I}}{\mathbb{B}}}\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)} = {\lim\limits_{Z_{1},{{\ldots\mspace{14mu} Z_{n}}\rightarrow\infty}}\left( {\sum\limits_{i = 1}^{n}{{2\frac{x_{i} - \left( {o_{i} + \frac{{abl}_{i} - {abu}_{i}}{2}} \right)}{{ad}_{i} - {abu}_{i} - {abl}_{i} - {bd}_{i}}}}^{Z_{i}}} \right)}} & (93) \end{matrix}$

Note that, as we would expect, Equations (86), (88), (91), and (93) are in the form of Equation (56) with q=n and p=0.

Direct Application of Analytical Composition

In cases where BSCAs can be deduced through inspection or simple geometric constructions and an analytical shape functions for the shapes involved are known, then analytical composition can be directly applied to construct an analytical shape function for the required BSCA. That is, we can apply analytical intersections, inversions and unions directly to the shape functions to construct an analytical shape function for the required BSCA. As an example of this approach consider the case illustrated in FIG. 9. In this case, as illustrated in FIG. 9A, we are interested in constructing the UEBSCA, EB, between a square, shape A, and a circle, shape B, where the square is two units wide by two units tall with its origin at its center and the circle has radius one with its origin at its center. From FIG. 9B we can see that EB=A {circle around (·)} B can be determined as the union of six shapes: two overlapping rectangles, R1 and R2, and four circles, C1, C2, C3, and C4. The shape functions for the four circles can be represented as

$\begin{matrix} \begin{matrix} {{{\mathbb{C}}\; 1\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)} = {{\mathbb{C}1}\mspace{11mu}\left( {\begin{bmatrix} x_{1} \\ x_{2} \end{bmatrix},\begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix}} \right)}} \\ {= {\left( {x_{1} - o_{1} - 1} \right)^{2} + \left( {x_{2} - o_{2} + 1} \right)^{2}}} \end{matrix} & (94) \\ \begin{matrix} {{{\mathbb{C}}\; 2\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)} = {{\mathbb{C}2}\mspace{11mu}\left( {\begin{bmatrix} x_{1} \\ x_{2} \end{bmatrix},\begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix}} \right)}} \\ {= {\left( {x_{1} - o_{1} + 1} \right)^{2} + \left( {x_{2} - o_{2} + 1} \right)^{2}}} \end{matrix} & (95) \\ \begin{matrix} {{{\mathbb{C}}\; 3\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)} = {{\mathbb{C}3}\mspace{11mu}\left( {\begin{bmatrix} x_{1} \\ x_{2} \end{bmatrix},\begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix}} \right)}} \\ {= {\left( {x_{1} - o_{1} + 1} \right)^{2} + \left( {x_{2} - o_{2} - 1} \right)^{2}}} \end{matrix} & (96) \\ \begin{matrix} {{{\mathbb{C}}\; 4\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)} = {{\mathbb{C}}\; 4\mspace{11mu}\left( {\begin{bmatrix} x_{1} \\ x_{2} \end{bmatrix},\begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix}} \right)}} \\ {= {\left( {x_{1} - o_{1} - 1} \right)^{2} + \left( {x_{2} - o_{2} - 1} \right)^{2}}} \end{matrix} & (97) \end{matrix}$

-   and, using superellipses, the two rectangles can be represented as

$\begin{matrix} {{1\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)} = {{1\left( {\begin{bmatrix} x_{1} \\ x_{2} \end{bmatrix},\begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix}} \right)} = {\lim\limits_{Z\rightarrow\infty}\left( {{\frac{x_{1} - o_{1}}{2}}^{Z} + {{x_{2} - o_{2}}}^{Z}} \right)}}} & (98) \\ {{2\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)} = {{2\left( {\begin{bmatrix} x_{1} \\ x_{2} \end{bmatrix},\begin{bmatrix} o_{1} \\ o_{2} \end{bmatrix}} \right)} = {\lim\limits_{Z\rightarrow\infty}\left( {{{x_{1} - o_{1}}}^{Z} + {\frac{x_{2} - o_{2}}{2}}^{Z}} \right)}}} & (99) \end{matrix}$

-   Using an analytical union we can construct an analytical shape     function for

$\begin{matrix} {{{EB} = {{A \odot B}\mspace{14mu}{as}}}{{{\mathbb{E}\mathbb{B}}\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)} = {\lim_{R\rightarrow\infty}\begin{pmatrix} {{{\mathbb{C}}\; 1\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)^{- R}} + {{\mathbb{C}}\; 2\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)^{- R}} +} \\ {{{\mathbb{C}}\; 3\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)^{- R}} + \;{{\mathbb{C}}\; 4\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)^{- R}} +} \\ {{{\mathbb{R}}\; 1\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)^{- 1}} + {{\mathbb{R}}\; 2\left( {\overset{\rightharpoonup}{X},\overset{\rightharpoonup}{O}} \right)^{- 1}}} \end{pmatrix}}}} & (100) \end{matrix}$ Methods

FIG. 10 illustrates the use of the present invention in a typical networked environment. The claimed invention is a software program that runs on one or more workstations 10 that may be in a networked environment. The various workstations 10 couple to a network 12 where they may communicate with each other. Additionally, the networked environment may include a shared storage device 14 and a network server 16. And, the networked environment may couple to the Internet 18. In addition to being able to operate on one or more workstations 10, the invention may use the resources of the shared storage device 14 and the network server 16. The invention may also use resources available through the Internet 18. One embodiment of the invention uses a LINUX based standalone workstation 10 and uses the FORTRAN programming language. One skilled in the arts will appreciate the invention can be implemented using other programming languages and that it may be hosted on other operating systems.

FIG. 11A illustrates a first embodiment of a method for determining if an arrangement of two shapes satisfies an exact or approximate analytical function representation of a boundary distance constraint between those shapes. This embodiment includes constructing 110 a function which is an exact or approximate analytical representation of the constraint between two shapes using one or more of the following: (1) one or more external boundary surface of closest approach where at least one of the external boundary surfaces of closest approach is not an n-sphere and each external boundary surface of closest approach is formed from two shapes and, optionally, additional boundary distance constraints between the shapes and is determined using the addition of two or three functions where one of the three functions represents the first shape and another function represents the second shape and, optionally, a third function represents the additional boundary distance constraints between the shapes; (2) one or more analytical compositions or; (3) one or more superellipsoid shape function approximations for the interior or exterior boundary surface of closest approach between a pair of axis aligned orthotopes with axis-aligned orthotopic boundary distance constraints. Further, this embodiment includes evaluating 120 the function constructed in 110 to determine if the constraint between the two shapes is exactly or approximately satisfied.

FIG. 11B illustrates a second embodiment of a method for determining if an arrangement of two shapes satisfies an exact or approximate analytical function representation of a boundary distance constraint between those shapes. This embodiment includes constructing 210 a function which is an exact or approximate analytical representation of the constraint between two shapes using one or more of the following: (1) one or more external boundary surface of closest approach where at least one of the external boundary surfaces of closest approach is not an n-sphere and each external boundary surface of closest approach is formed from two shapes and, optionally, additional boundary distance constraints between the shapes and is determined using the addition of two or three functions where one of the three functions represents the first shape and another function represents the second shape and, optionally, a third function represents the additional boundary distance constraints between the shapes; (2) one or more analytical compositions or; (3) one or more superellipsoid shape function approximations for the interior or exterior boundary surface of closest approach between a pair of axis aligned orthotopes with axis-aligned orthotopic boundary distance constraints. In addition, this embodiment includes assigning 215 values to variables and/or parameters of the function constructed in 210. Further, this embodiment includes evaluating 220 the function constructed in 210 using the assignments of 215 to determine if the constraint between the two shapes is exactly or approximately satisfied.

EXAMPLES

To illustrate the use of these methods we will, without loss of generality, consider three examples. The first two will demonstrate their use on shapes represented using DR shape spectrums and the second will demonstrate their use on shapes represented using shape spectrums.

Example 1

This example will illustrate the use of the method outlined in the flow chart of FIG. 11A. This example illustrates one application of this method in the manufacture of VLSI circuits and is based on the illustration in FIG. 12. In this example, as shown in FIG. 12, we have two circuit blocks, labeled C1 and C2, along with their DR shape spectrums and origins. We want to check to see that the circuit blocks satisfy a non-overlap boundary distance constraint that requires a minimum spacing of one tenth (0.1) of a unit between the adjacent sides of the circuit blocks. From FIG. 12 we have that:

-   -   C1 is two units wide and one unit tall with its origin initially         located at

$\quad\begin{bmatrix} 4 \\ 4 \end{bmatrix}$

-   and a DR shape spectrum:

$\begin{matrix} {{\mathcal{C}\; 1(\theta)} = \left\{ \begin{matrix} 1.0 & {\theta = 0^{{^\circ}}} \\ 0.5 & {\theta = 90^{{^\circ}}} \\ 1.0 & {\theta = 180^{{^\circ}}} \\ 0.5 & {\theta = 270^{{^\circ}}} \end{matrix} \right.} & (101) \end{matrix}$

-   -   C2 is one unit wide and one unit tall with its origin initially         located at

-   and a DR shape spectrum:

$\begin{matrix} {{\mathcal{C}\; 2(\theta)} = \left\{ \begin{matrix} 0.5 & {\theta = 0^{{^\circ}}} \\ 0.5 & {\theta = 90^{{^\circ}}} \\ 0.5 & {\theta = 180^{{^\circ}}} \\ 0.5 & {\theta = 270^{{^\circ}}} \end{matrix} \right.} & (102) \end{matrix}$

From the geometry of each circuit block and the minimum spacing requirement, one set of implicit distance spectrums that captures the minimum spacing requirements between the circuit blocks is

$\begin{matrix} {{\mathcal{D}_{C\; 1}(\theta)} = {{\mathcal{D}_{C\; 2}(\theta)} = \left\{ \begin{matrix} 0.05 & {\theta = 0^{{^\circ}}} \\ 0.05 & {\theta = 90^{{^\circ}}} \\ 0.05 & {\theta = 180^{{^\circ}}} \\ 0.05 & {\theta = 270^{{^\circ}}} \end{matrix} \right.}} & (103) \end{matrix}$

Based on the flow chart of FIG. 11A, step 110 can generate an approximate analytical function representation of the boundary distance constraint between C1 and C2 as follows: We begin by applying the distance spectrums to the shape spectrums for C1 and C2 as:

1_(D)(θ)=

1(θ)⊕

(θ)  (104)

2_(D)(θ)=

2(θ)⊕

(θ)  (105)

-   We can then determine the DR shape spectrum for the EBSCA for C1 and     C2, accounting for distance spectrums     (θ) and     (θ), as:

$\begin{matrix} {{{\mathcal{E}\mathcal{B}}(\theta)} = {{{\mathcal{C}\; 1_{D}(\theta)} + {\mathcal{C}\; 2_{D}(\theta)}} = \left\{ \begin{matrix} 1.6 & {\theta = 0^{{^\circ}}} \\ 1.1 & {\theta = 90^{{^\circ}}} \\ 1.6 & {\theta = 180^{{^\circ}}} \\ 1.1 & {\theta = 270^{{^\circ}}} \end{matrix} \right.}} & (106) \end{matrix}$

-   We can then generate affine functions for the DR shape spectrum of     Equation (106). Since the spectrum is symmetric we only need to     generate two affine functions whose coefficients are:

$\begin{matrix} {\begin{matrix} {{\overset{\rightharpoonup}{K}}_{0^{{^\circ}}} = {\frac{2}{{{\mathcal{E}\mathcal{B}}\left( {0^{{^\circ}} + 180^{{^\circ}}} \right)} + {{\mathcal{E}\mathcal{B}}\left( 0^{{^\circ}} \right)}}\begin{bmatrix} {\cos\left( {0{^\circ}} \right)} \\ {\sin\left( 0^{{^\circ}} \right)} \end{bmatrix}}} \\ {= {\frac{2}{3.2}\begin{bmatrix} 1 \\ 0 \end{bmatrix}}} \end{matrix}\begin{matrix} {K_{0^{{^\circ}}} = {{- {{\overset{\rightharpoonup}{K}}_{0^{{^\circ}}}^{T}\begin{bmatrix} 4.0 \\ 4.0 \end{bmatrix}}} + \frac{{{\mathcal{E}\mathcal{B}}\left( {0^{{^\circ}} + 180^{{^\circ}}} \right)} - {{\mathcal{E}\mathcal{B}}\left( 0^{{^\circ}} \right)}}{{{\mathcal{E}\mathcal{B}}\left( {0^{{^\circ}} + 180^{{^\circ}}} \right)} + {{\mathcal{E}\mathcal{B}}\left( 0^{{^\circ}} \right)}}}} \\ {= {{- \frac{2}{3.2}}4.0}} \end{matrix}} & (107) \\ {\begin{matrix} {{\overset{\rightharpoonup}{K}}_{90^{{^\circ}}} = {\frac{2}{{{\mathcal{E}\mathcal{B}}\left( {90^{{^\circ}} + 180^{{^\circ}}} \right)} + {{\mathcal{E}\mathcal{B}}\left( 90^{{^\circ}} \right)}}\begin{bmatrix} {\cos\left( {90{^\circ}} \right)} \\ {\sin\left( 90^{{^\circ}} \right)} \end{bmatrix}}} \\ {= {\frac{2}{2.2}\begin{bmatrix} 0 \\ 1 \end{bmatrix}}} \end{matrix}\begin{matrix} {K_{90^{{^\circ}}} = {{- {{\overset{\rightharpoonup}{K}}_{90^{{^\circ}}}^{T}\begin{bmatrix} 4.0 \\ 4.0 \end{bmatrix}}} + \frac{{{\mathcal{E}\mathcal{B}}\left( {90^{{^\circ}} + 180^{{^\circ}}} \right)} - {{\mathcal{E}\mathcal{B}}\left( 90^{{^\circ}} \right)}}{{{\mathcal{E}\mathcal{B}}\left( {90^{{^\circ}} + 180^{{^\circ}}} \right)} + {{\mathcal{E}\mathcal{B}}\left( 90^{{^\circ}} \right)}}}} \\ {= {{- \frac{2}{2.2}}4.0}} \end{matrix}} & (108) \end{matrix}$

-   We can then generate shape functions for these affine functions as

$\begin{matrix} {{{\mathbb{Q}}_{0^{{^\circ}}}\left( {\begin{bmatrix} x \\ y \end{bmatrix},\begin{bmatrix} 4.0 \\ 4.0 \end{bmatrix}} \right)} = {{{{{\overset{\rightharpoonup}{K}}_{0^{{^\circ}}}^{T}\begin{bmatrix} x \\ y \end{bmatrix}} + K_{0^{{^\circ}}}}} = {\frac{2\left( {x - 4.0} \right)}{3.2}}}} & (109) \\ {{{\mathbb{Q}}_{90^{{^\circ}}}\left( {\begin{bmatrix} x \\ y \end{bmatrix},\begin{bmatrix} 4.0 \\ 4.0 \end{bmatrix}} \right)} = {{{{{\overset{\rightharpoonup}{K}}_{90^{{^\circ}}}^{T}\begin{bmatrix} x \\ y \end{bmatrix}} + K_{90^{{^\circ}}}}} = {\frac{2\left( {y - 4.0} \right)}{2.2}}}} & (110) \end{matrix}$

-   followed by an analytical intersection to form the shape function

$\begin{matrix} {{{\mathbb{S}}\left( {\begin{bmatrix} 3.0 \\ 4.5 \end{bmatrix},\begin{bmatrix} 4.0 \\ 4.0 \end{bmatrix}} \right)} = {{\lim\limits_{Z\rightarrow\infty}\left( {{{\mathbb{Q}}_{0^{{^\circ}}}\left( {\begin{bmatrix} 3.0 \\ 4.5 \end{bmatrix},\begin{bmatrix} 4.0 \\ 4.0 \end{bmatrix}} \right)}^{Z} + \mspace{211mu}{{\mathbb{Q}}_{90^{{^\circ}}}\left( {\begin{bmatrix} 3.0 \\ 4.5 \end{bmatrix},\begin{bmatrix} 4.0 \\ 4.0 \end{bmatrix}} \right)}^{Z}} \right)}\mspace{175mu} = {\lim\limits_{Z\rightarrow\infty}\left( {{\frac{2\left( {3.0 - 4.0} \right)}{3.2}}^{Z} + {\frac{2\left( {4.5 - 4.0} \right)}{2.2}}^{Z}} \right)}}} & (111) \end{matrix}$

Based on Equation (111), and using a value of Z=3000 we can generate an analytical approximation of the non-overlap constraint function between C1 and C2 as

$\begin{matrix} {{{\frac{2\left( {3.0 - 4.0} \right)}{3.2}}^{3000} + {\frac{2\left( {4.5 - 4.0} \right)}{2.2}}^{3000}} > 1} & (112) \end{matrix}$

In step 120 evaluate Equation (112) to determine that the boundary distance constraint between C1 and C2 is not satisfied.

Example 2

In this example, we will again look at the problem outlined in Example 1. In this case however we will take advantage of the fact that shapes C1 and C2 are axis aligned rectangles subject to orthotopic boundary distance constraints. As such, we can use superellipsoid shape function approximations to generate an analytical approximation function for the BD constraint.

From FIG. 12 we can see that the dimension vectors associated with shapes C1, and C2 are

=[2,1]^(T)  (113)

=[1,1]^(T)  (114)

-   Additionally we know that the upper and lower separation distance     vectors between C1 and C2 are     =[0.1,0.1]^(T)  (115)     =[0.1,0.1]^(T)  (116)

With this information and using Equation (88) we can generate the shape function for the EBSCA between C1 and C2 as

$\begin{matrix} \begin{matrix} {{{\mathbb{E}\mathbb{B}}\left( {\begin{bmatrix} 3.0 \\ 4.5 \end{bmatrix},\begin{bmatrix} 4.0 \\ 4.0 \end{bmatrix}} \right)} = {\lim\limits_{Z\rightarrow\infty}\begin{pmatrix} {{{2\frac{3.0 - \left( {4.0 + \frac{0.1 - 0.1}{2}} \right)}{2 + 0.1 + 0.1 + 1}}}^{Z} +} \\ {{2\frac{4.5 - \left( {4.0 + \frac{0.1 - 0.1}{2}} \right)}{1 + 0.1 + 0.1 + 1}}}^{Z} \end{pmatrix}}} \\ {= {\lim\limits_{Z\rightarrow\infty}\left( {{{2\frac{3.0 - 4.0}{3.2}}}^{Z} + {{2\frac{4.5 - 4.0}{2.2}}}^{Z}} \right)}} \end{matrix} & (117) \end{matrix}$

Based on Equation (117) and using a value of Z=3000 we can generate an analytical approximation of the non-overlap constraint function between C1 and C2 as

$\begin{matrix} {{{\frac{2\left( {3.0 - 4.0} \right)}{3.2}}^{3000} + {\frac{2\left( {4.5 - 4.0} \right)}{2.2}}^{3000}} > 1} & (118) \end{matrix}$

-   which is identical to Equation (112) generated in Example 1.

Example 3

This example will illustrate the use of the method outlined in the flow chart of FIG. 11B. This example illustrates one application of this method in the manufacture of plate steel parts for one or two ships. In this example, as Illustrated in FIG. 13, we would like to check to see that the components for a pair of bulk head doors, BD1 and BD2, which are to be cut from a sheet of steel, are positioned such that they satisfy a non-overlap boundary distance constraint that accounts for the kerf of the cutting tool that will be used to cut the components from the sheet. The shape of BD1 and BD2 are cubic superellipses with height, width, and orientation h₁, w_(l), θ₁ and h₂, w₂, θ₂ respectively. The width of the kerf of the cutting tool is d.

One skilled in the art can show that the shape spectrum for a two-dimensional superellipsoid having origin [o_(x),o_(y)]^(T), semidiameters r_(x) and r_(y), and exponent n, as defined by the equation

${{{\frac{x - o_{x}}{r_{x}}}^{n} + {\frac{y - o_{y}}{r_{y}}}^{n}} = 1},$

-   has the following shape spectrum:

$\begin{matrix} {{{\mathcal{S}\mathcal{E}}(\theta)} = \left( {{{r_{x}{\sin(\theta)}}}^{\frac{n}{n - 1}} + {{r_{y}{\cos(\theta)}}}^{\frac{n}{n - 1}}} \right)^{\frac{n - 1}{n}}} & (119) \end{matrix}$

-   From this we see that the parameterized shape spectrums for BD1 and     BD2 are

$\begin{matrix} {{{\mathcal{B}\mathcal{D}}\; 1\left( {\theta,\theta_{1}} \right)} = \left( {{{\frac{w_{1}}{2}{\sin\left( {\theta - \theta_{1}} \right)}}}^{\frac{3}{2}} + {{\frac{h_{1}}{2}{\cos\left( {\theta - \theta_{1}} \right)}}}^{\frac{3}{3}}} \right)^{\frac{2}{3}}} & (120) \\ {{{\mathcal{B}\mathcal{D}}\; 2\left( {\theta,\theta_{2}} \right)} = \left( {{{\frac{w_{2}}{2}{\sin\left( {\theta - \theta_{2}} \right)}}}^{\frac{3}{2}} + {{\frac{h_{2}}{2}{\cos\left( {\theta - \theta_{2}} \right)}}}^{\frac{3}{3}}} \right)^{\frac{2}{3}}} & (121) \end{matrix}$

To account for the minimum distance, d, between BD1 and BD2 we define the following explicit distance spectrums for BD1 and BD2

$\begin{matrix} {{\mathcal{D}_{{\mathcal{B}\mathcal{D}}\; 1}(\theta)} = {{\mathcal{D}_{{\mathcal{B}\mathcal{D}}\; 2}(\theta)} = \frac{d}{2}}} & (122) \end{matrix}$

To generate an analytical function representation of the non-overlap boundary distance constraint between BD1 and BD2 step 210 can use Equations (120), (121), and (122) to determine the parameterized shape spectrum for the EBSCA of shapes BD1 and BD2 with separation distance d as

$\begin{matrix} \begin{matrix} {{{\mathcal{E}\mathcal{B}}\left( {\theta,\theta_{1},\theta_{2},d} \right)} = {{{\mathcal{B}\mathcal{D}}\; 1\left( {\theta,\theta_{1}} \right)} + {\mathcal{D}_{{\mathcal{B}\mathcal{D}}\; 1}(\theta)} +}} \\ {{{\mathcal{B}\mathcal{D}}\; 2\left( {{\theta + 180^{{^\circ}}},\theta_{2}} \right)} + {\mathcal{D}_{{\mathcal{B}\mathcal{D}}\; 2}\left( {\theta + 180^{{^\circ}}} \right)}} \\ {= {{{\mathcal{B}\mathcal{D}}\; 1\left( {\theta,\theta_{1}} \right)} + {{\mathcal{B}\mathcal{D}}\; 2\left( {\theta,\theta_{2}} \right)} + d}} \\ {= {\left( {{{\frac{w_{1}}{2}{\sin\left( {\theta - \theta_{1}} \right)}}}^{\frac{3}{2}} + {{\frac{h_{1}}{2}{\cos\left( {\theta - \theta_{1}} \right)}}}^{\frac{3}{3}}} \right)^{\frac{2}{3}} +}} \\ {\left( {{{\frac{w_{2}}{2}{\sin\left( {\theta - \theta_{2}} \right)}}}^{\frac{3}{2}} + {{\frac{h_{2}}{2}{\cos\left( {\theta - \theta_{2}} \right)}}}^{\frac{3}{3}}} \right)^{\frac{2}{3}} +} \\ {d} \end{matrix} & (123) \end{matrix}$

-   Based on Equations (65) through (68), one way to compute the value     of a shape function,

${{\mathbb{E}\mathbb{B}}\left( {\begin{bmatrix} x_{2} \\ y_{2} \\ \theta_{2} \end{bmatrix},\begin{bmatrix} x_{1} \\ y_{1} \\ \theta_{1} \end{bmatrix}} \right)},$

-   for the shape spectrum of Equation (123) is as follows:     Procedure 3:

$\begin{matrix} {{1.\mspace{14mu}{Compute}\mspace{14mu}\varphi} = {\tan^{- 1}\left( \frac{y_{2} - y_{1}}{x_{2} - x_{1}} \right)}} \\ {{2.\mspace{14mu}{Solve}\mspace{14mu}\theta} = {\varphi - {{\tan^{- 1}\left( \frac{\frac{\partial{{\mathcal{E}\mathcal{B}}\left( {\theta,\theta_{1},\theta_{2},d} \right)}}{\partial\theta}}{{\mathcal{E}\mathcal{B}}\left( {\theta,\theta_{1},\theta_{2},d} \right)} \right)}\mspace{14mu}{for}\mspace{14mu}\theta}}} \\ {{3.\mspace{14mu}{Compute}\mspace{14mu} x_{p}} = {{{{\mathcal{E}\mathcal{B}}\left( {\theta,\theta_{1},\theta_{2},d} \right)}{\cos(\theta)}} - {{\sin(\theta)}\frac{\partial{{\mathcal{E}\mathcal{B}}\left( {\theta,\theta_{1},\theta_{2},d} \right)}}{\partial\theta}} + x_{1}}} \\ {{4.\mspace{14mu}{Compute}\mspace{14mu} y_{p}} = {{{{\mathcal{E}\mathcal{B}}\left( {\theta,\theta_{1},\theta_{2},d} \right)}{\sin(\theta)}} + {{\cos(\theta)}\frac{\partial{{\mathcal{E}\mathcal{B}}\left( {\theta,\theta_{1},\theta_{2},d} \right)}}{\partial\theta}} + y_{1}}} \\ {{5.\mspace{14mu}{Compute}\mspace{14mu}{{\mathbb{E}\mathbb{B}}\left( {\begin{bmatrix} x_{2} \\ y_{2} \\ \theta_{2} \end{bmatrix},\begin{bmatrix} x_{1} \\ y_{1} \\ \theta_{1} \end{bmatrix}} \right)}} = \sqrt{\frac{\left( {x_{2} - x_{1}} \right)^{2} + \left( {y_{2} - y_{1}} \right)^{2}}{\left( {x_{p} - x_{1}} \right)^{2} + \left( {y_{p} - y_{1}} \right)^{2}}}} \end{matrix}$

-   From this we can define the analytical representation of the     non-overlap constraint between BD1 and BD2 as

$\begin{matrix} {{{\mathbb{E}\mathbb{B}}\left( {\begin{bmatrix} x_{2} \\ y_{2} \\ \theta_{2} \end{bmatrix},\begin{bmatrix} x_{1} \\ y_{1} \\ \theta_{1} \end{bmatrix}} \right)} > 1} & (124) \end{matrix}$

-   Note that due to the form of the differential equation in step 2 of     Procedure 3 it may be necessary to solve it using a numerical method     such as, for example, a half interval search, where the initial     interval is 0°≦θ<360°.

Step 215 assigns values to h₁, w₁, θ₁, h₂, w₂, θ₂ and d.

Step 220 evaluates Equation (124) using the assignments of step 215 to determine if the non-overlap boundary distance constraint between BD1 and BD2 is satisfied.

Other embodiments of the present invention will be apparent to those skilled in the art after considering this disclosure or practicing the disclosed invention. The specification and examples above are exemplary only, with the true scope of the present invention being determined by the following claims. 

I claim the following invention:
 1. A method to manufacture one or more articles of manufacture that determines if a boundary distance constraint between two shapes is exactly or approximately satisfied comprising: (a) constructing a function which is an exact or approximate analytical representation of the constraint between two shapes using one or more external boundary surface of closest approach functions where at least one of the external boundary surfaces of closest approach is a non-n-sphere and each external boundary surface of closest approach is formed from two shapes and, additional boundary distance constraints between the shapes and is determined using the addition of three functions where one of the three functions represents the first shape and another function represents the second shape and a third function represents the additional boundary distance constraints between the shapes; (b) evaluating the function of step (a) to determine if the constraint between the two shapes is exactly or approximately satisfied.
 2. The claim according to claim 1 wherein said step (a) further comprises constructing functions using (1) one or more analytical compositions and, (2) one or more superellipsoid shape function approximations for the interior or exterior boundary surface of closest approach between a pair of axis aligned orthotopes with axis-aligned orthotopic boundary distance constraints.
 3. The claim according to claim 1 wherein said step (a) further comprises constructing a function which is an exact or approximate analytical representation of the constraint between two shapes using one or more analytical compositions.
 4. The claim according to claim 1 wherein said step (a) further comprises constructing a function which is an exact or approximate analytical representation of the constraint between two shapes using one or more superellipsoid shape function approximations for the interior or exterior boundary surface of closest approach between a pair of axis aligned orthotopes with axis-aligned orthotopic boundary distance constraints.
 5. A method to manufacture one or more articles of manufacture that determines if a boundary distance constraint between two shapes is exactly or approximately satisfied comprising: (a) constructing a function which is an exact or approximate analytical representation of the constraint between two shapes using one or more external boundary surface of closest approach functions where at least one of the external boundary surfaces of closest approach is a non-n-sphere and each external boundary surface of closest approach is formed from two shapes and additional boundary distance constraints between the shapes and is determined using the addition of three functions where one of the three functions represents the first shape and another function represents the second shape and, a third function represents the additional boundary distance constraints between the shapes; (b) assigning values to variables and/or parameters of the function constructed in step (a); (c) evaluating the function of step (a) using the assignments of step (b) to determine if the constraint between the two shapes is exactly or approximately satisfied.
 6. The claim according to claim 5 wherein said step (a) further comprises constructing functions using (1) one or more analytical compositions and, (2) one or more superellipsoid shape function approximations for the interior or exterior boundary surface of closest approach between a pair of axis aligned orthotopes with axis-aligned orthotopic boundary distance constraints.
 7. The claim according to claim 5 wherein said step (a) further comprises constructing a function which is an exact or approximate analytical representation of the constraint between two shapes using one or more analytical compositions.
 8. The claim according to claim 5 wherein said step (a) further comprises constructing a function which is an exact or approximate analytical representation of the constraint between two shapes using one or more superellipsoid shape function approximations for the interior or exterior boundary surface of closest approach between a pair of axis aligned orthotopes with axis-aligned orthotopic boundary distance constraints.
 9. A non-transitory program storage device readable by a computing device that tangibly embodies a program of instructions executable by the computing device to perform a method to manufacture one or more articles of manufacture that determines if a boundary distance constraint between two shapes is exactly or approximately satisfied comprising: (a) constructing a function which is an exact or approximate analytical representation of the constraint between two shapes using one or more external boundary surface of closest approach functions where at least one of the external boundary surfaces of closest approach is a non-n-sphere and each external boundary surface of closest approach is formed from two shapes and additional boundary distance constraints between the shapes and is determined using the addition of three functions where one of the three functions represents the first shape and another function represents the second shape and a third function represents the additional boundary distance constraints between the shapes; (b) evaluating the function of step (a) to determine if the constraint between the two shapes is exactly or approximately satisfied.
 10. The claim according to claim 9 wherein said step (a) further comprises constructing functions using (1) one or more analytical compositions and, (2) one or more superellipsoid shape function approximations for the interior or exterior boundary surface of closest approach between a pair of axis aligned orthotopes with axis-aligned orthotopic boundary distance constraints.
 11. The claim according to claim 9 wherein said step (a) further comprises constructing a function which is an exact or approximate analytical representation of the constraint between two shapes using one or more analytical compositions.
 12. The claim according to claim 9 wherein said step (a) further comprises constructing a function which is an exact or approximate analytical representation of the constraint between two shapes using one or more superellipsoid shape function approximations for the interior or exterior boundary surface of closest approach between a pair of axis aligned orthotopes with axis-aligned orthotopic boundary distance constraints.
 13. A non-transitory program storage device readable by a computing device that tangibly embodies a program of instructions executable by the computing device to perform a method to manufacture one or more articles of manufacture that determines if a boundary distance constraint between two shapes is exactly or approximately satisfied comprising: (a) constructing a function which is an exact or approximate analytical representation of the constraint between two shapes using one or more external boundary surface of closest approach functions where at least one of the external boundary surfaces of closest approach is a non-n-sphere and each external boundary surface of closest approach is formed from two shapes and additional boundary distance constraints between the shapes and is determined using the addition of three functions where one of the three functions represents the first shape and another function represents the second shape and a third function represents the additional boundary distance constraints between the shapes; (b) assigning values to variables and/or parameters of the function constructed in step (a); (c) evaluating the function of step (a) using the assignments of step (b) to determine if the constraint between the two shapes is exactly or approximately satisfied.
 14. The claim according to claim 13 wherein said step (a) further comprises constructing functions using (1) one or more analytical compositions and, (2) one or more superellipsoid shape function approximations for the interior or exterior boundary surface of closest approach between a pair of axis aligned orthotopes with axis-aligned orthotopic boundary distance constraints.
 15. The claim according to claim 13 wherein said step (a) further comprises constructing a function which is an exact or approximate analytical representation of the constraint between two shapes using one or more analytical compositions.
 16. The claim according to claim 13 wherein said step (a) further comprises constructing a function which is an exact or approximate analytical representation of the constraint between two shapes using one or more superellipsoid shape function approximations for the interior or exterior boundary surface of closest approach between a pair of axis aligned orthotopes with axis-aligned orthotopic boundary distance constraints. 